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Math Word Problem Worksheets

Read, explore, and solve over 1000 math word problems based on addition, subtraction, multiplication, division, fraction, decimal, ratio and more. These word problems help children hone their reading and analytical skills; understand the real-life application of math operations and other math topics. Print our exclusive colorful theme-based worksheets for a fun-filled teaching experience! Use the answer key provided below each worksheet to assist children in verifying their solutions.

List of Word Problem Worksheets

Explore the word problem worksheets in detail.

Addition Word Problems

Have 'total' fun by adding up a wide range of addends displayed in these worksheets! Simple real-life scenarios form the basis of these addition word problem worksheets.

Subtraction Word Problems

Learning can be a huge 'take away'! Find the difference between the numbers provided in each subtraction word problem. Large number subtraction up to six-digits can also be found here.

Addition and Subtraction Word Problems

Bring on 'A' game with our addition and subtraction word problems! Read, analyze, and solve real-life scenarios based on adding and subtracting numbers as required.

Multiplication Word Problems

Get 'product'ive with over 100 highly engaging multiplication word problems! Find the product and use the answer key to verify your solution. Free worksheets are also available.

Division Word Problems

"Divide and conquer" this huge collection of division word problems. Exclusive worksheets are available for the division problem leaving no remainder and with the remainder.

Fraction Word Problems

Perform various mathematical operations to solve the umpteen number of word problems based on like and unlike fractions, proper and improper fractions, and mixed numbers.

Decimal Word Problems

Let's get to the 'point'! Add, subtract, multiply, and divide to solve these decimal word problems. A wide selection of printable worksheets is available in this section. Use the answer key to verify your answers.

Ratio Word problems

Double up your success ratio with these sets of word problems, which cover a multitude of topics like express in the ratio, reducing the ratio, part-to-part ratio, part-to-whole ratio and more.

Venn Diagram Word Problems - Two Sets

Help your children improve their data analysis skills with these well-researched Venn diagram word problem worksheets. Find the union, intersection, complement and difference of two sets.

Venn Diagram Word Problems - Three Sets

These Venn diagram word problems provide ample practice in real-life application of Venn diagram involving three sets. The worksheets containing the universal set are also included.

Equation Word Problems

The printable worksheets here feature exercises consisting of one-step, two-step and multi-step equation word problems involving fractions, decimals and integers. MCQs to test the knowledge acquired have also been included.

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Published 2016 Revised 2019

Mathematical Problem Solving in the Early Years: Developing Opportunities, Strategies and Confidence

familiar contexts
meaningful purposes
mathematical complexity.

which they understand - in familiar contexts,
where the outcomes matter to them - even if imaginary,
where they have control of the process,
involving mathematics with which they are confident.
taking some from one doll and giving to another, in several moves,
starting again and dealing, either in ones or twos,
taking two from each original doll and giving to the new doll,
collecting the biscuits and crumbling them into a heap, then sharing out handfuls of crumbs.

brute force: trying to hammer bits so that they fit,
local correction: adjusting one part, often creating a different problem,
dismantling: starting all over again,
holistic review: considering multiple relations or simultaneous adjustments e.g. repairing by insertion and reversal.
getting a feel for the problem, looking at it holistically, checking they have understood e.g. talking it through or asking questions;
planning, preparing and predicting outcomes e.g. gathering blocks together before building;
monitoring progress towards the goal e.g. checking that the bears will fit the houses;
being systematic, trying possibilities methodically without repetition, rather than at random, e.g. separating shapes tried from those not tried in a puzzle;
trying alternative approaches and evaluating strategies e.g. trying different positions for shapes;
refining and improving solutions e.g. solving a puzzle again in fewer moves (Gifford, 2005: 153).
Getting to grips: What are we trying to do?
Connecting to previous experience: Have we done anything like this before?
Planning: What do we need?
Considering alternative methods: Is there another way?
Monitoring progress: How does it look so far?
Evaluating solutions: Does it work? How can we check? Could we make it even better?

Construction - finding shapes which fit together or balance
Pattern-making - creating a rule to create a repeating pattern
Shape pictures - selecting shapes with properties to represent something
Puzzles - finding ways of fitting shapes to fit a puzzle
Role-play areas - working out how much to pay in a shop
Measuring tools - finding out how different kinds of scales work
Nesting, posting, ordering - especially if they are not obvious
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sharing equal amounts e.g. at snack time
tidying up, checking nothing is lost
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PE: organising in groups, timing and recording

Decision making - what shall we call the new guinea pig?
Parties, picnics and trips e.g. how much lemonade shall we make?
Design Projects - the role play area, new outdoor gardens or circuits
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Teaching Problem Solving in Math

Freebies , Math , Planning

Every year my students can be fantastic at math…until they start to see math with words. For some reason, once math gets translated into reading, even my best readers start to panic. There is just something about word problems, or problem-solving, that causes children to think they don’t know how to complete them.

Every year in math, I start off by teaching my students problem-solving skills and strategies. Every year they moan and groan that they know them. Every year – paragraph one above. It was a vicious cycle. I needed something new.

$Problem solving tends to REALLY throw students for a loop when they're first introduced to it. Up until this point, math has been numbers, but now, math is numbers and words. I discuss four important steps I take in teaching problem solving, and I provide you with examples as I go. You can also check out my math workshop problem solving unit for third grade!$

I put together a problem-solving unit that would focus a bit more on strategies and steps in hopes that that would create problem-solving stars.

The Problem Solving Strategies

First, I wanted to make sure my students all learned the different strategies to solve problems, such as guess-and-check, using visuals (draw a picture, act it out, and modeling it), working backward, and organizational methods (tables, charts, and lists). In the past, I had used worksheet pages that would introduce one and provide the students with plenty of problems practicing that one strategy. I did like that because students could focus more on practicing the strategy itself, but I also wanted students to know when to use it, too, so I made sure they had both to practice.

I provided students with plenty of practice of the strategies, such as in this guess-and-check game.

Problem solving tends to REALLY throw students for a loop when they're first introduced to it. Up until this point, math has been numbers, but now, math is numbers and words. I discuss four important steps I take in teaching problem solving, and I provide you with examples as I go. You can also check out my math workshop problem solving unit for third grade!

There’s also this visuals strategy wheel practice.

I also provided them with paper dolls and a variety of clothing to create an organized list to determine just how many outfits their “friend” would have.

Then, as I said above, we practiced in a variety of ways to make sure we knew exactly when to use them. I really wanted to make sure they had this down!

Anyway, after I knew they had down the various strategies and when to use them, then we went into the actual problem-solving steps.

The Problem Solving Steps

I wanted students to understand that when they see a story problem, it isn’t scary. Really, it’s just the equation written out in words in a real-life situation. Then, I provided them with the “keys to success.”

S tep 1 – Understand the Problem. To help students understand the problem, I provided them with sample problems, and together we did five important things:

read the problem carefully
restated the problem in our own words
crossed out unimportant information
circled any important information
stated the goal or question to be solved

We did this over and over with example problems.

Once I felt the students had it down, we practiced it in a game of problem-solving relay. Students raced one another to see how quickly they could get down to the nitty-gritty of the word problems. We weren’t solving the problems – yet.

Then, we were on to Step 2 – Make a Plan . We talked about how this was where we were going to choose which strategy we were going to use. We also discussed how this was where we were going to figure out what operation to use. I taught the students Sheila Melton’s operation concept map.

We talked about how if you know the total and know if it is equal or not, that will determine what operation you are doing. So, we took an example problem, such as:

Sheldon wants to make a cupcake for each of his 28 classmates. He can make 7 cupcakes with one box of cupcake mix. How many boxes will he need to buy?

We started off by asking ourselves, “Do we know the total?” We know there are a total of 28 classmates. So, yes, we are separating. Then, we ask, “Is it equal?” Yes, he wants to make a cupcake for EACH of his classmates. So, we are dividing: 28 divided by 7 = 4. He will need to buy 4 boxes. (I actually went ahead and solved it here – which is the next step, too.)

Step 3 – Solving the problem . We talked about how solving the problem involves the following:

taking our time
working the problem out
showing all our work
estimating the answer
using thinking strategies

We talked specifically about thinking strategies. Just like in reading, there are thinking strategies in math. I wanted students to be aware that sometimes when we are working on a problem, a particular strategy may not be working, and we may need to switch strategies. We also discussed that sometimes we may need to rethink the problem, to think of related content, or to even start over. We discussed these thinking strategies:

switch strategies or try a different one
rethink the problem
think of related content
decide if you need to make changes
check your work
but most important…don’t give up!

To make sure they were getting in practice utilizing these thinking strategies, I gave each group chart paper with a letter from a fellow “student” (not a real student), and they had to give advice on how to help them solve their problem using the thinking strategies above.

Finally, Step 4 – Check It. This is the step that students often miss. I wanted to emphasize just how important it is! I went over it with them, discussing that when they check their problems, they should always look for these things:

compare your answer to your estimate
check for reasonableness
check your calculations
add the units
restate the question in the answer
explain how you solved the problem

Then, I gave students practice cards. I provided them with example cards of “students” who had completed their assignments already, and I wanted them to be the teacher. They needed to check the work and make sure it was completed correctly. If it wasn’t, then they needed to tell what they missed and correct it.

To demonstrate their understanding of the entire unit, we completed an adorable lap book (my first time ever putting together one or even creating one – I was surprised how well it turned out, actually). It was a great way to put everything we discussed in there.

Once we were all done, students were officially Problem Solving S.T.A.R.S. I just reminded students frequently of this acronym.

Stop – Don’t rush with any solution; just take your time and look everything over.

Think – Take your time to think about the problem and solution.

Act – Act on a strategy and try it out.

Review – Look it over and see if you got all the parts.

Wow, you are a true trooper sticking it out in this lengthy post! To sum up the majority of what I have written here, I have some problem-solving bookmarks FREE to help you remember and to help your students!

You can grab these problem-solving bookmarks for FREE by clicking here .

You can do any of these ideas without having to purchase anything. However, if you are looking to save some time and energy, then they are all found in my Math Workshop Problem Solving Unit . The unit is for grade three, but it may work for other grade levels. The practice problems are all for the early third-grade level.

freebie , Math Workshop , Problem Solving

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Unit 1: Algebra foundations

Unit 2: solving equations & inequalities, unit 3: working with units, unit 4: linear equations & graphs, unit 5: forms of linear equations, unit 6: systems of equations, unit 7: inequalities (systems & graphs), unit 8: functions, unit 9: sequences, unit 10: absolute value & piecewise functions, unit 11: exponents & radicals, unit 12: exponential growth & decay, unit 13: quadratics: multiplying & factoring, unit 14: quadratic functions & equations, unit 15: irrational numbers, unit 16: creativity in algebra.

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Algebra has a reputation for being difficult, but Math Games makes struggling with it a thing of the past. Kids can use our free, exciting games to play and compete with their friends as they progress in this subject!

Algebra concepts that pupils can work on here include:

Solving and writing variable equations to find answers to real-world problems
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How to Teach Kids Problem-Solving Skills

KidStock / Blend Images / Getty Images

Steps to Follow
Allow Consequences

Whether your child can't find their math homework or has forgotten their lunch, good problem-solving skills are the key to helping them manage their life.

A 2010 study published in Behaviour Research and Therapy found that kids who lack problem-solving skills may be at a higher risk of depression and suicidality. Additionally, the researchers found that teaching a child problem-solving skills can improve mental health .

You can begin teaching basic problem-solving skills during preschool and help your child sharpen their skills into high school and beyond.

Why Problem-Solving Skills Matter

Kids face a variety of problems every day, ranging from academic difficulties to problems on the sports field. Yet few of them have a formula for solving those problems.

Kids who lack problem-solving skills may avoid taking action when faced with a problem.

Rather than put their energy into solving the problem, they may invest their time in avoiding the issue. That's why many kids fall behind in school or struggle to maintain friendships .

Other kids who lack problem-solving skills spring into action without recognizing their choices. A child may hit a peer who cuts in front of them in line because they are not sure what else to do.

Or, they may walk out of class when they are being teased because they can't think of any other ways to make it stop. Those impulsive choices may create even bigger problems in the long run.

The 5 Steps of Problem-Solving

Kids who feel overwhelmed or hopeless often won't attempt to address a problem. But when you give them a clear formula for solving problems, they'll feel more confident in their ability to try. Here are the steps to problem-solving:

Identify the problem . Just stating the problem out loud can make a big difference for kids who are feeling stuck. Help your child state the problem, such as, "You don't have anyone to play with at recess," or "You aren't sure if you should take the advanced math class."
Develop at least five possible solutions . Brainstorm possible ways to solve the problem. Emphasize that all the solutions don't necessarily need to be good ideas (at least not at this point). Help your child develop solutions if they are struggling to come up with ideas. Even a silly answer or far-fetched idea is a possible solution. The key is to help them see that with a little creativity, they can find many different potential solutions.
Identify the pros and cons of each solution . Help your child identify potential positive and negative consequences for each potential solution they identified.
Pick a solution. Once your child has evaluated the possible positive and negative outcomes, encourage them to pick a solution.
Test it out . Tell them to try a solution and see what happens. If it doesn't work out, they can always try another solution from the list that they developed in step two.

Practice Solving Problems

When problems arise, don’t rush to solve your child’s problems for them. Instead, help them walk through the problem-solving steps. Offer guidance when they need assistance, but encourage them to solve problems on their own. If they are unable to come up with a solution, step in and help them think of some. But don't automatically tell them what to do.

When you encounter behavioral issues, use a problem-solving approach. Sit down together and say, "You've been having difficulty getting your homework done lately. Let's problem-solve this together." You might still need to offer a consequence for misbehavior, but make it clear that you're invested in looking for a solution so they can do better next time.

Use a problem-solving approach to help your child become more independent.

If they forgot to pack their soccer cleats for practice, ask, "What can we do to make sure this doesn't happen again?" Let them try to develop some solutions on their own.

Kids often develop creative solutions. So they might say, "I'll write a note and stick it on my door so I'll remember to pack them before I leave," or "I'll pack my bag the night before and I'll keep a checklist to remind me what needs to go in my bag."

Provide plenty of praise when your child practices their problem-solving skills.

Allow for Natural Consequences

Natural consequences may also teach problem-solving skills. So when it's appropriate, allow your child to face the natural consequences of their action. Just make sure it's safe to do so.

For example, let your teenager spend all of their money during the first 10 minutes you're at an amusement park if that's what they want. Then, let them go for the rest of the day without any spending money.

This can lead to a discussion about problem-solving to help them make a better choice next time. Consider these natural consequences as a teachable moment to help work together on problem-solving.

Becker-Weidman EG, Jacobs RH, Reinecke MA, Silva SG, March JS. Social problem-solving among adolescents treated for depression . Behav Res Ther . 2010;48(1):11-18. doi:10.1016/j.brat.2009.08.006

Pakarinen E, Kiuru N, Lerkkanen M-K, Poikkeus A-M, Ahonen T, Nurmi J-E. Instructional support predicts childrens task avoidance in kindergarten . Early Child Res Q . 2011;26(3):376-386. doi:10.1016/j.ecresq.2010.11.003

Schell A, Albers L, von Kries R, Hillenbrand C, Hennemann T. Preventing behavioral disorders via supporting social and emotional competence at preschool age . Dtsch Arztebl Int . 2015;112(39):647–654. doi:10.3238/arztebl.2015.0647

Cheng SC, She HC, Huang LY. The impact of problem-solving instruction on middle school students’ physical science learning: Interplays of knowledge, reasoning, and problem solving . EJMSTE . 2018;14(3):731-743.

Vlachou A, Stavroussi P. Promoting social inclusion: A structured intervention for enhancing interpersonal problem‐solving skills in children with mild intellectual disabilities . Support Learn . 2016;31(1):27-45. doi:10.1111/1467-9604.12112

Öğülmüş S, Kargı E. The interpersonal cognitive problem solving approach for preschoolers . Turkish J Educ . 2015;4(17347):19-28. doi:10.19128/turje.181093

American Academy of Pediatrics. What's the best way to discipline my child? .

Kashani-Vahid L, Afrooz G, Shokoohi-Yekta M, Kharrazi K, Ghobari B. Can a creative interpersonal problem solving program improve creative thinking in gifted elementary students? . Think Skills Creat . 2017;24:175-185. doi:10.1016/j.tsc.2017.02.011

Shokoohi-Yekta M, Malayeri SA. Effects of advanced parenting training on children's behavioral problems and family problem solving . Procedia Soc Behav Sci . 2015;205:676-680. doi:10.1016/j.sbspro.2015.09.106

By Amy Morin, LCSW Amy Morin, LCSW, is the Editor-in-Chief of Verywell Mind. She's also a psychotherapist, an international bestselling author of books on mental strength and host of The Verywell Mind Podcast. She delivered one of the most popular TEDx talks of all time.

Math and Logic Puzzles

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120 Math Word Problems To Challenge Students Grades 1 to 8

Written by Marcus Guido

Hey teachers! 👋

Use Prodigy to spark a love for math in your students – including when solving word problems!

Teaching Tools
Subtraction
Multiplication
Mixed operations
Ordering and number sense
Comparing and sequencing
Physical measurement
Ratios and percentages
Probability and data relationships

You sit at your desk, ready to put a math quiz, test or activity together. The questions flow onto the document until you hit a section for word problems.

A jolt of creativity would help. But it doesn’t come.

Whether you’re a 3rd grade teacher or an 8th grade teacher preparing students for high school, translating math concepts into real world examples can certainly be a challenge.

This resource is your jolt of creativity. It provides examples and templates of math word problems for 1st to 8th grade classes.

There are 120 examples in total.

The list of examples is supplemented by tips to create engaging and challenging math word problems.

120 Math word problems, categorized by skill

Addition word problems.

$A teacher is teaching three students with a whiteboard happily.$

Best for: 1st grade, 2nd grade

1. Adding to 10: Ariel was playing basketball. 1 of her shots went in the hoop. 2 of her shots did not go in the hoop. How many shots were there in total?

2. Adding to 20: Adrianna has 10 pieces of gum to share with her friends. There wasn’t enough gum for all her friends, so she went to the store to get 3 more pieces of gum. How many pieces of gum does Adrianna have now?

3. Adding to 100: Adrianna has 10 pieces of gum to share with her friends. There wasn’t enough gum for all her friends, so she went to the store and got 70 pieces of strawberry gum and 10 pieces of bubble gum. How many pieces of gum does Adrianna have now?

4. Adding Slightly over 100: The restaurant has 175 normal chairs and 20 chairs for babies. How many chairs does the restaurant have in total?

5. Adding to 1,000: How many cookies did you sell if you sold 320 chocolate cookies and 270 vanilla cookies?

6. Adding to and over 10,000: The hobby store normally sells 10,576 trading cards per month. In June, the hobby store sold 15,498 more trading cards than normal. In total, how many trading cards did the hobby store sell in June?

7. Adding 3 Numbers: Billy had 2 books at home. He went to the library to take out 2 more books. He then bought 1 book. How many books does Billy have now?

8. Adding 3 Numbers to and over 100: Ashley bought a big bag of candy. The bag had 102 blue candies, 100 red candies and 94 green candies. How many candies were there in total?

Subtraction word problems

Best for: 1st grade, second grade

9. Subtracting to 10: There were 3 pizzas in total at the pizza shop. A customer bought 1 pizza. How many pizzas are left?

10. Subtracting to 20: Your friend said she had 11 stickers. When you helped her clean her desk, she only had a total of 10 stickers. How many stickers are missing?

11. Subtracting to 100: Adrianna has 100 pieces of gum to share with her friends. When she went to the park, she shared 10 pieces of strawberry gum. When she left the park, Adrianna shared another 10 pieces of bubble gum. How many pieces of gum does Adrianna have now?

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12. Subtracting Slightly over 100: Your team scored a total of 123 points. 67 points were scored in the first half. How many were scored in the second half?

13. Subtracting to 1,000: Nathan has a big ant farm. He decided to sell some of his ants. He started with 965 ants. He sold 213. How many ants does he have now?

14. Subtracting to and over 10,000: The hobby store normally sells 10,576 trading cards per month. In July, the hobby store sold a total of 20,777 trading cards. How many more trading cards did the hobby store sell in July compared with a normal month?

15. Subtracting 3 Numbers: Charlene had a pack of 35 pencil crayons. She gave 6 to her friend Theresa. She gave 3 to her friend Mandy. How many pencil crayons does Charlene have left?

16. Subtracting 3 Numbers to and over 100: Ashley bought a big bag of candy to share with her friends. In total, there were 296 candies. She gave 105 candies to Marissa. She also gave 86 candies to Kayla. How many candies were left?

Multiplication word problems

A hand holding a pen is doing calculation on a pice of papper

Best for: 2nd grade, 3rd grade

17. Multiplying 1-Digit Integers: Adrianna needs to cut a pan of brownies into pieces. She cuts 6 even columns and 3 even rows into the pan. How many brownies does she have?

18. Multiplying 2-Digit Integers: A movie theatre has 25 rows of seats with 20 seats in each row. How many seats are there in total?

19. Multiplying Integers Ending with 0: A clothing company has 4 different kinds of sweatshirts. Each year, the company makes 60,000 of each kind of sweatshirt. How many sweatshirts does the company make each year?

20. Multiplying 3 Integers: A bricklayer stacks bricks in 2 rows, with 10 bricks in each row. On top of each row, there is a stack of 6 bricks. How many bricks are there in total?

21. Multiplying 4 Integers: Cayley earns $5 an hour by delivering newspapers. She delivers newspapers 3 days each week, for 4 hours at a time. After delivering newspapers for 8 weeks, how much money will Cayley earn?

Division word problems

Best for: 3rd grade, 4th grade, 5th grade

22. Dividing 1-Digit Integers: If you have 4 pieces of candy split evenly into 2 bags, how many pieces of candy are in each bag?

23. Dividing 2-Digit Integers: If you have 80 tickets for the fair and each ride costs 5 tickets, how many rides can you go on?

24. Dividing Numbers Ending with 0: The school has $20,000 to buy new computer equipment. If each piece of equipment costs $50, how many pieces can the school buy in total?

25. Dividing 3 Integers: Melissa buys 2 packs of tennis balls for $12 in total. All together, there are 6 tennis balls. How much does 1 pack of tennis balls cost? How much does 1 tennis ball cost?

26. Interpreting Remainders: An Italian restaurant receives a shipment of 86 veal cutlets. If it takes 3 cutlets to make a dish, how many cutlets will the restaurant have left over after making as many dishes as possible?

Mixed operations word problems

A female teacher is instructing student math on a blackboard

27. Mixing Addition and Subtraction: There are 235 books in a library. On Monday, 123 books are taken out. On Tuesday, 56 books are brought back. How many books are there now?

28. Mixing Multiplication and Division: There is a group of 10 people who are ordering pizza. If each person gets 2 slices and each pizza has 4 slices, how many pizzas should they order?

29. Mixing Multiplication, Addition and Subtraction: Lana has 2 bags with 2 marbles in each bag. Markus has 2 bags with 3 marbles in each bag. How many more marbles does Markus have?

30. Mixing Division, Addition and Subtraction: Lana has 3 bags with the same amount of marbles in them, totaling 12 marbles. Markus has 3 bags with the same amount of marbles in them, totaling 18 marbles. How many more marbles does Markus have in each bag?

Ordering and number sense word problems

31. Counting to Preview Multiplication: There are 2 chalkboards in your classroom. If each chalkboard needs 2 pieces of chalk, how many pieces do you need in total?

32. Counting to Preview Division: There are 3 chalkboards in your classroom. Each chalkboard has 2 pieces of chalk. This means there are 6 pieces of chalk in total. If you take 1 piece of chalk away from each chalkboard, how many will there be in total?

33. Composing Numbers: What number is 6 tens and 10 ones?

34. Guessing Numbers: I have a 7 in the tens place. I have an even number in the ones place. I am lower than 74. What number am I?

35. Finding the Order: In the hockey game, Mitchell scored more points than William but fewer points than Auston. Who scored the most points? Who scored the fewest points?

Fractions word problems

A student is drawing on a notebook, holding a pencil.

Best for: 3rd grade, 4th grade, 5th grade, 6th grade

36. Finding Fractions of a Group: Julia went to 10 houses on her street for Halloween. 5 of the houses gave her a chocolate bar. What fraction of houses on Julia’s street gave her a chocolate bar?

37. Finding Unit Fractions: Heather is painting a portrait of her best friend, Lisa. To make it easier, she divides the portrait into 6 equal parts. What fraction represents each part of the portrait?

38. Adding Fractions with Like Denominators: Noah walks ⅓ of a kilometre to school each day. He also walks ⅓ of a kilometre to get home after school. How many kilometres does he walk in total?

39. Subtracting Fractions with Like Denominators: Last week, Whitney counted the number of juice boxes she had for school lunches. She had ⅗ of a case. This week, it’s down to ⅕ of a case. How much of the case did Whitney drink?

40. Adding Whole Numbers and Fractions with Like Denominators: At lunchtime, an ice cream parlor served 6 ¼ scoops of chocolate ice cream, 5 ¾ scoops of vanilla and 2 ¾ scoops of strawberry. How many scoops of ice cream did the parlor serve in total?

41. Subtracting Whole Numbers and Fractions with Like Denominators: For a party, Jaime had 5 ⅓ bottles of cola for her friends to drink. She drank ⅓ of a bottle herself. Her friends drank 3 ⅓. How many bottles of cola does Jaime have left?

42. Adding Fractions with Unlike Denominators: Kevin completed ½ of an assignment at school. When he was home that evening, he completed ⅚ of another assignment. How many assignments did Kevin complete?

43. Subtracting Fractions with Unlike Denominators: Packing school lunches for her kids, Patty used ⅞ of a package of ham. She also used ½ of a package of turkey. How much more ham than turkey did Patty use?

44. Multiplying Fractions: During gym class on Wednesday, the students ran for ¼ of a kilometre. On Thursday, they ran ½ as many kilometres as on Wednesday. How many kilometres did the students run on Thursday? Write your answer as a fraction.

45. Dividing Fractions: A clothing manufacturer uses ⅕ of a bottle of colour dye to make one pair of pants. The manufacturer used ⅘ of a bottle yesterday. How many pairs of pants did the manufacturer make?

46. Multiplying Fractions with Whole Numbers: Mark drank ⅚ of a carton of milk this week. Frank drank 7 times more milk than Mark. How many cartons of milk did Frank drink? Write your answer as a fraction, or as a whole or mixed number.

Decimals word problems

Best for: 4th grade, 5th grade

47. Adding Decimals: You have 2.6 grams of yogurt in your bowl and you add another spoonful of 1.3 grams. How much yogurt do you have in total?

48. Subtracting Decimals: Gemma had 25.75 grams of frosting to make a cake. She decided to use only 15.5 grams of the frosting. How much frosting does Gemma have left?

49. Multiplying Decimals with Whole Numbers: Marshall walks a total of 0.9 kilometres to and from school each day. After 4 days, how many kilometres will he have walked?

50. Dividing Decimals by Whole Numbers: To make the Leaning Tower of Pisa from spaghetti, Mrs. Robinson bought 2.5 kilograms of spaghetti. Her students were able to make 10 leaning towers in total. How many kilograms of spaghetti does it take to make 1 leaning tower?

51. Mixing Addition and Subtraction of Decimals: Rocco has 1.5 litres of orange soda and 2.25 litres of grape soda in his fridge. Antonio has 1.15 litres of orange soda and 0.62 litres of grape soda. How much more soda does Rocco have than Angelo?

52. Mixing Multiplication and Division of Decimals: 4 days a week, Laura practices martial arts for 1.5 hours. Considering a week is 7 days, what is her average practice time per day each week?

Comparing and sequencing word problems

Four students are sitting together and discussing math questions

Best for: Kindergarten, 1st grade, 2nd grade

53. Comparing 1-Digit Integers: You have 3 apples and your friend has 5 apples. Who has more?

54. Comparing 2-Digit Integers: You have 50 candies and your friend has 75 candies. Who has more?

55. Comparing Different Variables: There are 5 basketballs on the playground. There are 7 footballs on the playground. Are there more basketballs or footballs?

56. Sequencing 1-Digit Integers: Erik has 0 stickers. Every day he gets 1 more sticker. How many days until he gets 3 stickers?

57. Skip-Counting by Odd Numbers: Natalie began at 5. She skip-counted by fives. Could she have said the number 20?

58. Skip-Counting by Even Numbers: Natasha began at 0. She skip-counted by eights. Could she have said the number 36?

59. Sequencing 2-Digit Numbers: Each month, Jeremy adds the same number of cards to his baseball card collection. In January, he had 36. 48 in February. 60 in March. How many baseball cards will Jeremy have in April?

Time word problems

66. Converting Hours into Minutes: Jeremy helped his mom for 1 hour. For how many minutes was he helping her?

69. Adding Time: If you wake up at 7:00 a.m. and it takes you 1 hour and 30 minutes to get ready and walk to school, at what time will you get to school?

70. Subtracting Time: If a train departs at 2:00 p.m. and arrives at 4:00 p.m., how long were passengers on the train for?

71. Finding Start and End Times: Rebecca left her dad’s store to go home at twenty to seven in the evening. Forty minutes later, she was home. What time was it when she arrived home?

Money word problems

Best for: 1st grade, 2nd grade, 3rd grade, 4th grade, 5th grade

60. Adding Money: Thomas and Matthew are saving up money to buy a video game together. Thomas has saved $30. Matthew has saved $35. How much money have they saved up together in total?

61. Subtracting Money: Thomas has $80 saved up. He uses his money to buy a video game. The video game costs $67. How much money does he have left?

62. Multiplying Money: Tim gets $5 for delivering the paper. How much money will he have after delivering the paper 3 times?

63. Dividing Money: Robert spent $184.59 to buy 3 hockey sticks. If each hockey stick was the same price, how much did 1 cost?

64. Adding Money with Decimals: You went to the store and bought gum for $1.25 and a sucker for $0.50. How much was your total?

65. Subtracting Money with Decimals: You went to the store with $5.50. You bought gum for $1.25, a chocolate bar for $1.15 and a sucker for $0.50. How much money do you have left?

67. Applying Proportional Relationships to Money: Jakob wants to invite 20 friends to his birthday, which will cost his parents $250. If he decides to invite 15 friends instead, how much money will it cost his parents? Assume the relationship is directly proportional.

68. Applying Percentages to Money: Retta put $100.00 in a bank account that gains 20% interest annually. How much interest will be accumulated in 1 year? And if she makes no withdrawals, how much money will be in the account after 1 year?

Physical measurement word problems

Best for: 1st grade, 2nd grade, 3rd grade, 4th grade

72. Comparing Measurements: Cassandra’s ruler is 22 centimetres long. April’s ruler is 30 centimetres long. How many centimetres longer is April’s ruler?

73. Contextualizing Measurements: Picture a school bus. Which unit of measurement would best describe the length of the bus? Centimetres, metres or kilometres?

74. Adding Measurements: Micha’s dad wants to try to save money on gas, so he has been tracking how much he uses. Last year, Micha’s dad used 100 litres of gas. This year, her dad used 90 litres of gas. How much gas did he use in total for the two years?

75. Subtracting Measurements: Micha’s dad wants to try to save money on gas, so he has been tracking how much he uses. Over the past two years, Micha’s dad used 200 litres of gas. This year, he used 100 litres of gas. How much gas did he use last year?

A tablet showing an example of Prodigy Math's battle gameplay.

76. Multiplying Volume and Mass: Kiera wants to make sure she has strong bones, so she drinks 2 litres of milk every week. After 3 weeks, how many litres of milk will Kiera drink?

77. Dividing Volume and Mass: Lillian is doing some gardening, so she bought 1 kilogram of soil. She wants to spread the soil evenly between her 2 plants. How much will each plant get?

78. Converting Mass: Inger goes to the grocery store and buys 3 squashes that each weigh 500 grams. How many kilograms of squash did Inger buy?

79. Converting Volume: Shad has a lemonade stand and sold 20 cups of lemonade. Each cup was 500 millilitres. How many litres did Shad sell in total?

80. Converting Length: Stacy and Milda are comparing their heights. Stacy is 1.5 meters tall. Milda is 10 centimetres taller than Stacy. What is Milda’s height in centimetres?

81. Understanding Distance and Direction: A bus leaves the school to take students on a field trip. The bus travels 10 kilometres south, 10 kilometres west, another 5 kilometres south and 15 kilometres north. To return to the school, in which direction does the bus have to travel? How many kilometres must it travel in that direction?

Ratios and percentages word problems

Best for: 4th grade, 5th grade, 6th grade

82. Finding a Missing Number: The ratio of Jenny’s trophies to Meredith’s trophies is 7:4. Jenny has 28 trophies. How many does Meredith have?

83. Finding Missing Numbers: The ratio of Jenny’s trophies to Meredith’s trophies is 7:4. The difference between the numbers is 12. What are the numbers?

84. Comparing Ratios: The school’s junior band has 10 saxophone players and 20 trumpet players. The school’s senior band has 18 saxophone players and 29 trumpet players. Which band has the higher ratio of trumpet to saxophone players?

85. Determining Percentages: Mary surveyed students in her school to find out what their favourite sports were. Out of 1,200 students, 455 said hockey was their favourite sport. What percentage of students said hockey was their favourite sport?

86. Determining Percent of Change: A decade ago, Oakville’s population was 67,624 people. Now, it is 190% larger. What is Oakville’s current population?

87. Determining Percents of Numbers: At the ice skate rental stand, 60% of 120 skates are for boys. If the rest of the skates are for girls, how many are there?

88. Calculating Averages: For 4 weeks, William volunteered as a helper for swimming classes. The first week, he volunteered for 8 hours. He volunteered for 12 hours in the second week, and another 12 hours in the third week. The fourth week, he volunteered for 9 hours. For how many hours did he volunteer per week, on average?

Probability and data relationships word problems

$Two students are calculating on a whiteboard$

Best for: 4th grade, 5th grade, 6th grade, 7th grade

89. Understanding the Premise of Probability: John wants to know his class’s favourite TV show, so he surveys all of the boys. Will the sample be representative or biased?

90. Understanding Tangible Probability: The faces on a fair number die are labelled 1, 2, 3, 4, 5 and 6. You roll the die 12 times. How many times should you expect to roll a 1?

91. Exploring Complementary Events: The numbers 1 to 50 are in a hat. If the probability of drawing an even number is 25/50, what is the probability of NOT drawing an even number? Express this probability as a fraction.

92. Exploring Experimental Probability: A pizza shop has recently sold 15 pizzas. 5 of those pizzas were pepperoni. Answering with a fraction, what is the experimental probability that he next pizza will be pepperoni?

93. Introducing Data Relationships: Maurita and Felice each take 4 tests. Here are the results of Maurita’s 4 tests: 4, 4, 4, 4. Here are the results for 3 of Felice’s 4 tests: 3, 3, 3. If Maurita’s mean for the 4 tests is 1 point higher than Felice’s, what’s the score of Felice’s 4th test?

94. Introducing Proportional Relationships: Store A is selling 7 pounds of bananas for $7.00. Store B is selling 3 pounds of bananas for $6.00. Which store has the better deal?

95. Writing Equations for Proportional Relationships: Lionel loves soccer, but has trouble motivating himself to practice. So, he incentivizes himself through video games. There is a proportional relationship between the amount of drills Lionel completes, in x , and for how many hours he plays video games, in y . When Lionel completes 10 drills, he plays video games for 30 minutes. Write the equation for the relationship between x and y .

Geometry word problems

Best for: 4th grade, 5th grade, 6th grade, 7th grade, 8th grade

96. Introducing Perimeter: The theatre has 4 chairs in a row. There are 5 rows. Using rows as your unit of measurement, what is the perimeter?

97. Introducing Area: The theatre has 4 chairs in a row. There are 5 rows. How many chairs are there in total?

98. Introducing Volume: Aaron wants to know how much candy his container can hold. The container is 20 centimetres tall, 10 centimetres long and 10 centimetres wide. What is the container’s volume?

99. Understanding 2D Shapes: Kevin draws a shape with 4 equal sides. What shape did he draw?

100. Finding the Perimeter of 2D Shapes: Mitchell wrote his homework questions on a piece of square paper. Each side of the paper is 8 centimetres. What is the perimeter?

101. Determining the Area of 2D Shapes: A single trading card is 9 centimetres long by 6 centimetres wide. What is its area?

102. Understanding 3D Shapes: Martha draws a shape that has 6 square faces. What shape did she draw?

103. Determining the Surface Area of 3D Shapes: What is the surface area of a cube that has a width of 2cm, height of 2 cm and length of 2 cm?

104. Determining the Volume of 3D Shapes: Aaron’s candy container is 20 centimetres tall, 10 centimetres long and 10 centimetres wide. Bruce’s container is 25 centimetres tall, 9 centimetres long and 9 centimetres wide. Find the volume of each container. Based on volume, whose container can hold more candy?

105. Identifying Right-Angled Triangles: A triangle has the following side lengths: 3 cm, 4 cm and 5 cm. Is this triangle a right-angled triangle?

106. Identifying Equilateral Triangles: A triangle has the following side lengths: 4 cm, 4 cm and 4 cm. What kind of triangle is it?

107. Identifying Isosceles Triangles: A triangle has the following side lengths: 4 cm, 5 cm and 5 cm. What kind of triangle is it?

108. Identifying Scalene Triangles: A triangle has the following side lengths: 4 cm, 5 cm and 6 cm. What kind of triangle is it?

109. Finding the Perimeter of Triangles: Luigi built a tent in the shape of an equilateral triangle. The perimeter is 21 metres. What is the length of each of the tent’s sides?

110. Determining the Area of Triangles: What is the area of a triangle with a base of 2 units and a height of 3 units?

111. Applying Pythagorean Theorem: A right triangle has one non-hypotenuse side length of 3 inches and the hypotenuse measures 5 inches. What is the length of the other non-hypotenuse side?

112. Finding a Circle’s Diameter: Jasmin bought a new round backpack. Its area is 370 square centimetres. What is the round backpack’s diameter?

113. Finding a Circle's Area: Captain America’s circular shield has a diameter of 76.2 centimetres. What is the area of his shield?

114. Finding a Circle’s Radius: Skylar lives on a farm, where his dad keeps a circular corn maze. The corn maze has a diameter of 2 kilometres. What is the maze’s radius?

Variables word problems

$A hand is calculating math problem on a blacboard$

Best for: 6th grade, 7th grade, 8th grade

115. Identifying Independent and Dependent Variables: Victoria is baking muffins for her class. The number of muffins she makes is based on how many classmates she has. For this equation, m is the number of muffins and c is the number of classmates. Which variable is independent and which variable is dependent?

116. Writing Variable Expressions for Addition: Last soccer season, Trish scored g goals. Alexa scored 4 more goals than Trish. Write an expression that shows how many goals Alexa scored.

117. Writing Variable Expressions for Subtraction: Elizabeth eats a healthy, balanced breakfast b times a week. Madison sometimes skips breakfast. In total, Madison eats 3 fewer breakfasts a week than Elizabeth. Write an expression that shows how many times a week Madison eats breakfast.

118. Writing Variable Expressions for Multiplication: Last hockey season, Jack scored g goals. Patrik scored twice as many goals than Jack. Write an expression that shows how many goals Patrik scored.

119. Writing Variable Expressions for Division: Amanda has c chocolate bars. She wants to distribute the chocolate bars evenly among 3 friends. Write an expression that shows how many chocolate bars 1 of her friends will receive.

120. Solving Two-Variable Equations: This equation shows how the amount Lucas earns from his after-school job depends on how many hours he works: e = 12h . The variable h represents how many hours he works. The variable e represents how much money he earns. How much money will Lucas earn after working for 6 hours?

How to easily make your own math word problems & word problems worksheets

Two teachers are discussing math with a pen and a notebook

Armed with 120 examples to spark ideas, making your own math word problems can engage your students and ensure alignment with lessons. Do:

Link to Student Interests: By framing your word problems with student interests, you’ll likely grab attention. For example, if most of your class loves American football, a measurement problem could involve the throwing distance of a famous quarterback.
Make Questions Topical: Writing a word problem that reflects current events or issues can engage students by giving them a clear, tangible way to apply their knowledge.
Include Student Names: Naming a question’s characters after your students is an easy way make subject matter relatable, helping them work through the problem.
Be Explicit: Repeating keywords distills the question, helping students focus on the core problem.
Test Reading Comprehension: Flowery word choice and long sentences can hide a question’s key elements. Instead, use concise phrasing and grade-level vocabulary.
Focus on Similar Interests: Framing too many questions with related interests -- such as football and basketball -- can alienate or disengage some students.
Feature Red Herrings: Including unnecessary information introduces another problem-solving element, overwhelming many elementary students.

A key to differentiated instruction , word problems that students can relate to and contextualize will capture interest more than generic and abstract ones.

Final thoughts about math word problems

You’ll likely get the most out of this resource by using the problems as templates, slightly modifying them by applying the above tips. In doing so, they’ll be more relevant to -- and engaging for -- your students.

Regardless, having 120 curriculum-aligned math word problems at your fingertips should help you deliver skill-building challenges and thought-provoking assessments.

The result?

A greater understanding of how your students process content and demonstrate understanding, informing your ongoing teaching approach.

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100 Math Riddles for Kids (and Grown-Ups Too!)

So many ways to have fun with math.

$Math Riddles Feature$

Math riddles are tricky problems or questions that students have to use their knowledge of math operations, vocabulary, and general knowledge to solve. They’re also a fun way to engage in creative thinking and collaboration as they work to solve math riddles together.

As a warm-up or challenge activity, math riddles:

Improve problem-solving skills.
Build resilience. Students are bound to miss one (or many) riddles. Having to try and try again is a skill they’ll need in math and beyond.
Increase engagement. Math riddles can be a fun way to learn and practice math, which can increase motivation.
Support collaboration. If students must solve a problem in groups, they’ll practice working together and relying on each other’s unique approaches and thinking styles.

Whatever the reason, check out these 100 math riddles to challenge every student.

Math Riddles for Elementary School

How many sides does a circle have.

None. A circle does not have sides.

I’m an even, single-digit number. Once you write me, I have no start or end. I look like a standing pair of glasses. Who am I?

Ashley buys one new toy every 30 days. how many toys does he have in one year, which is longer, 10 centimeters or 10 inches, if you multiply me by any other number, the answer will always be the same. what number am i, what weighs more, a pound of feathers or a pound of bricks.

They weigh the same.

When Pam was 8, her sister was half her age. Now, Pam is 14. How old is her sister?

Pam’s sister is 4 years younger, so her sister is now 10 (14 – 4 = 10).

If a boy blows 18 bubbles, and then he pops 7, eats 6, stomps 5, and blows another 1, how many are left?

If you’re at a theater to watch a movie that starts in one hour, how many minutes do you have to wait to watch it.

60 minutes.

Nina has six siblings who were born two years apart. Kevin, the youngest, is 7 years old, while Nina is the oldest. How old is Nina?

Nina is 19: 7 + 2 + 2 + 2 + 2 + 2 + 2 = 19.

How did the soccer fan know before the game that the score would be 0-0?

The score is always 0-0 before the game.

What is the Roman numeral for 100?

You’re 8 years old, and your uncle is 53. how old will your uncle be when you are 23, at what point do parallel lines meet.

Never. Parallel lines never intersect.

If it took seven people 10 hours to build a doghouse, how many hours will it take 15 people to build the same doghouse?

None. The dog house is already built.

A farmer has 23 goats on his farm. One day after a storm, all but 9 ran away. How many goats does the farmer have now?

Place three matches on the table. how can you add two more to make eight.

Add two matches to make the Roman numeral VIII.

How many times can you take 10 away from 100?

Once. After that, the number you’re subtracting from is 90.

There’s something common between the numbers 11, 88, and 96. What is it?

You can rotate them 180° or upside down and they will still look the same.

What can you put between 8 and 9 to make the result greater than 8, but less than 9?

A decimal point (8.9).

This number is the smallest prime number and an even number. What is it?

Henry is 1,000 mm tall, and hank is 100 cm tall. who’s taller.

They are the same height.

Can you find a way to get the number 23 by using only the number 2?

22 + 2/2 = 23

How many cupcakes are in a baker’s dozen?

I get 11 when i add 5 and 6, but when i take 7 and 6, i get 1. what am i, if 1 = 4, 2 = 8, 3 = 12, then 4 = how much.

Since 1 = 4, then 4 = 1.

There is an odd number that becomes even if you take away one letter from it. What is it?

Seven. Take away the S and it is “even.”

What three numbers have the same result if they are added or multiplied together?

1, 2, and 3.

If days on Mars are as long as two weeks on Earth, how long is an hour?

14 Earth hours.

Math Riddles for Middle Schoolers

If you go to the movies and you’re paying, is it cheaper to take one friend to the movies twice or two friends to the movies at the same time.

It is cheaper to take two friends at the same time, since you’d be paying for yourself plus two others (three people) as opposed to paying for yourself and one friend twice, which equals four people.

If four men can build four tables in four hours, how many can eight men build in eight hours?

I am four times as old as my daughter. in 20 years time, i shall be twice as old as her. how old are we now.

I am 40 and my daughter is 10.

There is a lily pad on a small pond. Each day, the lily pad doubles its size. On day 20 it covers the whole pond. On what day was the lily pad the size of half the pond?

At a clothing store, the owner has devised his own method of pricing items. a vest costs $20, socks cost $25, a tie costs $15, and a blouse costs $30. using this method, how much would a pair of underwear cost.

$45. The pricing method consists of charging $5 for each letter required to spell the item.

One is to three as three is to five and five is to four and four is the magic number. What is the pattern?

The word “one” has three letters. The word “three” has five letters. “Five” has four letters. “Four” has four letters.

The ages of a father and son add up to 66. The father’s age is the son’s age reversed. How old could they be? (There are three possible solutions.)

51 and 15, 42 and 24, or 60 and 06.

Pick a number from 1 to 10, multiply it by 2, add 10, divide it by 2, now subtract the number you picked from your total. What is it?

You want to boil a two-minute egg. if you only have a three-minute timer (hourglass), a four-minute timer, and a five-minute timer, how can you boil the egg for only two minutes.

Once the water is boiling, turn the three-minute timer and five-minute timer over. When the three-minute timer runs out, put the egg in the boiling water. When the five-minute timer runs out, two minutes have elapsed and it is time to take the egg out of the water. You do not need the four-minute timer.

81 x 9 = 801. What must you do to make the this equation true?

Turn it upside down. 108 = 6 x 18.

How much will a 38° angle measure when looked at under a microscope that magnifies 10 times?

It will be 38 degrees.

If 1 = 5, 2 = 15, 3 = 215, and 4 = 3,215, what does 5 equal?

5 = 1, because 1 = 5.

If seven people meet one another and each shakes hands only once with each of the others, how many handshakes happened?

Using only addition, how can you add eight 8s to get the number 1,000.

888 + 88 + 8 + 8 + 8 =1,000.

How much dirt is there in a hole that is 3.45 m by 6.21 m?

None. There is no dirt in a hole.

A phone and case cost $110 in total. The price of the phone is $100 more than the case. How much is the phone?

An empty bus pulls up to a stop, and 10 people get on. at the next stop, 5 people get off, and twice as many people get on as at the first stop. at the third stop, 25 get off. how many people are on the bus.

One—the driver.

During what month do people sleep the least?

February because it has the fewest days.

There are 12 kids in a class. Six kids are wearing socks, four are wearing shoes, and three are wearing both. How many have bare feet?

Mr. kim has five sons. each of his sons has a sister. how many children does mr. kim have.

Six. They all have the same sister.

There are six chocolates in a basket. Six people each take one chocolate. How can it be that one chocolate is left in the basket?

The last person took the basket with the chocolate in it.

Kevin finished half of his report at school. He finishes another quarter after school. How much does he have left to finish?

A quarter (1 – 1/2 – 1/4 = 1/4).

What is the next number? 1, 2, 4, 7, 11, 16, __?

At an ice cream shop, a single scoop costs $5. a double scoop costs $7. a triple scoop costs $8. what’s the best value.

The triple scoop.

Maria made brownies. She cuts the brownies into 12 equal pieces. How many cuts did she make?

Five cuts (two vertical, three horizontal).

Hailey has three library books at home. She finished reading one of them and returned it. Then her mom bought her two books. How many books does she currently have at home?

Four (3 – 1 + 2 = 4).

Which statement is correct: “Eight and six are fifteen” or “six and eight are fifteen”?

Neither of them is correct: 8 + 6 =14.

Math Riddles for High Schoolers

Cara leaves new york at 8 a.m., driving 35 mph. nancy starts driving to new york at 50 mph. when they meet, which one will be farthest away from new york.

They will be the same distance from New York.

A teacher says that there are fewer than 30 students but more than 20 in a classroom. The children can be divided into groups of two, three, four, six, and eight with no leftover students. How many students are in the class?

Seven brothers were born two years apart. the youngest brother is 7. how old is the oldest brother, charlie has one child, a boy. he’s having another child. what chance does he have of having another boy, what is the next number: 1, 3, 7, 15, 31, __, what is the next number: 2, 4, 6, 10, 16, __, there are 100 houses in the neighborhood where sam and his brother live. sam’s house number is the reverse of his brother’s house number. the difference between their house numbers ends with 2. what are their house numbers, in a three-digit number, the second digit is four times greater than the third digit. the first digit is three lower than the second digit. what is the number, it is raining at midnight and the weather forecast says that tomorrow and the next day will be clear. will it be sunny in 48 hours.

No, in 48 hours, it will be night so it will not be sunny.

A 300-foot train traveling 300 feet per minute must travel through a 300-foot-long tunnel. How long will it take the train to travel through the tunnel?

Two minutes. It takes the front of the train one minute, and the rest of the train will take two minutes to clear the tunnel.

Robert and David played several golf matches against each other in a week. They played for a pizza at each match, but no pizzas were purchased until the end of the week. If Robert and David had the same number of wins at any time, those pizzas were canceled. Robert won four matches (but no pizzas), and David won three pizzas. How many rounds of golf were played?

11. David won seven matches—four to cancel out Robert’s four wins and three more to win the pizzas.

I add 5 to 9 and get 2. The answer is correct, but how?

When it is 9 a.m., add five hours to it, and you will get to 2 p.m.

When Carlos was 6 years old, his little sister, Julia, was half his age. If Carlos is 40 years old today, how old is Julia?

Tom was asked to paint numbers outside 100 apartments, which means he will have to paint numbers 1 through 100. how many times will he have to paint the number 8, there are 100 pairs of dogs in a zoo. a pair of puppies are born for each dog. unfortunately, 23 of the dogs have not survived. how many dogs are left in total.

977 dogs. 100 x 2 = 200; 200 + 800 = 1,000; 1,000 – 23 = 977

If a hen and a half lay an egg and a half in a day and a half, how many eggs will half a dozen hens lay in half a dozen days?

Leon works at the aquarium. when he tries to put each turtle in its own tank, he has one turtle too many. but if he puts two turtles per tank, he has one tank too many. how many turtles and how many tanks does leon have.

He has three tanks and four turtles.

Math Riddles for Adults

You have a perfect cube. can you divide your cube into smaller cubes that all have different volumes.

No. There is no way for cubes of all different volumes to correctly fit inside of a larger cube. There would be empty spaces as the cubes got smaller and smaller and you would have no way to fill these spaces. Eventually, the cubes would be too small to continue.

One morning you need to find some socks, but your light is broken. You know there are 10 purple socks and 10 orange socks in your drawer, but they’re all mixed up. They are completely the same except for their color. How many socks do you have to pick to ensure you have a matching pair?

You only have to pick three socks. Because there are only two colors of socks in the drawer, you will definitely have a matching pair if you take three.

You are cutting up a pie. First you cut it into two pieces. With your next cut, you produce four pieces. The third cut results in seven pieces. How many pieces can you cut with seven slices?

What is special about the number 854,917,632.

It’s the numbers one through ten in alphabetical order.

You are 8 feet away from a door, and with each move you advance half the distance to the door. How many moves will it take to reach the door?

You will never reach it because you will always have another half distance to cross.

Joe has 10 coins totaling $1.19. From these coins, he cannot make exact change for a dollar, half dollar, quarter, dime, or nickel. What are the coins?

A half dollar, a quarter, four dimes, and four pennies.

When shipping something, Tom can place 10 small boxes or 8 large boxes into a carton. A total of 96 boxes were sent in one shipment and the number of small boxes was less than large boxes. How many cartons did he ship?

11 cartons.

A certain number has three digits. The sum of the three digits equals 36 times this number. Seven times the left digit plus nine equals five times the sum of the two other digits. Eight times the second digit minus nine is equal to the sum of the first and third. What is the number?

Can you arrange four nines to make it equal to 100.

99 + 9 / 9 = 100

Easy Math Riddles

I am a number that is 5 more than the number of toes you have on your feet. what am i, i am a number that is two more than the number of days in a week. what am i, i’m less than 15 but more than 10. you can find me by adding 10 to 3. what am i, i am more than 10 but less than 14. i am one more than the number of months in one year. what am i, i’m less than 8 but more than 5. i’m one more than the fingers on your left hand. what am i, i’m a number you can find by adding the number of sides of a triangle. what am i, i’m between 1 and 5. i’m less than 4 and more than 2. what am i, i am a number you get when you add the sides of a rectangle and a square., hard math riddles, a snail is at the bottom of a 20-meter pit. every day the snail climbs 5 meters up, but at night it slides down 4 meters. how many days does it take before the snail reaches the top.

The snail reaches the top of the pit on the 16th day. On the first day, the snail reaches a height of 5 meters and slides down 4 meters at night, and thus ends at a height of 1 meter. On the second day, he reaches 6 meters but slides back to 2 meters. On the third day, he reaches 7 meters but slides back to 3 meters. On the 15th day, he reaches 19 meters but slides back to 15 meters. On the 16th day, he reaches 20 meters, so now he is at the top of the pit.

There are eight balls with eight different numbers in them: 1, 3, 5, 7, 9, 11, 13, 15. Select three balls that equal 30.

Flip the nine and turn it into a 6 and then the three balls are 6, 11, and 13.

Can you make 24 from the numbers 3, 3, 8, and 8? You can only use the operations + – x / (), and you have to use all four numbers.

8 / (3 – 8/3) = 24.

How can you take 2 from 5 and leave 4?

Remove the 2 letters F and E from five and you have IV which is the Roman numeral for four.

Granny left half her money to her granddaughter and half that amount to her grandson. She left a sixth to her brother, and the remainder, $1,000, to the dogs’ home. How much did she leave altogether?

Focus on the fractions. Add one-half, one-quarter, and one-sixth for a total that is a fraction of twelfths (2 + 4 + 6 = 12). You can also think about it as 6/12, 3/12, 2/12, which equals 11/12. If the remainder is $1,000, that must be one-twelfth, so the total is $12,000.

What single digit appears most frequently between and including the numbers 1 and 1,000?

The most common digit is 1. Every number 1 through 9 appears exactly the same number of times in every 10 numbers. But because we included the number 1,000, there’s an extra occurrence of the number 1. In total, the number 1 appears 301 times, and every other number appears 300 times.

A small number of cards has been lost from a complete pack. If I deal among four people, three cards remain. If I deal among three people, two remain, and if I deal among five people, two cards remain. How many cards are there?

What is the smallest whole number that is equal to seven times the sum of its digits, what is the smallest number that increases by 12 when it is flipped and turned upside-down, you have two u.s. coins worth a total value of 30 cents. one of them is not a nickel. what are the two coins.

One quarter and one nickel.

Come share your best math riddles in our We Are Teachers HELPLINE group on Facebook!

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$Math riddles are a great way to encourage creative thinking, apply knowledge, and have fun! Here are 100 math riddles from easy to difficult.$

$Multiply this number with any other number and you will get the same answer every time. What is the number?$

35 Math Brain Teasers To Puzzle Even Your Smartest Students

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For everyone whose relationship with mathematics is distant or broken, Jo Boaler , a professor at Stanford Graduate School of Education (GSE), has ideas for repairing it. She particularly wants young people to feel comfortable with numbers from the start – to approach the subject with playfulness and curiosity, not anxiety or dread.

“Most people have only ever experienced what I call narrow mathematics – a set of procedures they need to follow, at speed,” Boaler says. “Mathematics should be flexible, conceptual, a place where we play with ideas and make connections. If we open it up and invite more creativity, more diverse thinking, we can completely transform the experience.”

Boaler, the Nomellini and Olivier Professor of Education at the GSE, is the co-founder and faculty director of Youcubed , a Stanford research center that provides resources for math learning that has reached more than 230 million students in over 140 countries. In 2013 Boaler, a former high school math teacher, produced How to Learn Math , the first massive open online course (MOOC) on mathematics education. She leads workshops and leadership summits for teachers and administrators, and her online courses have been taken by over a million users.

In her new book, Math-ish: Finding Creativity, Diversity, and Meaning in Mathematics , Boaler argues for a broad, inclusive approach to math education, offering strategies and activities for learners at any age. We spoke with her about why creativity is an important part of mathematics, the impact of representing numbers visually and physically, and how what she calls “ishing” a math problem can help students make better sense of the answer.

What do you mean by “math-ish” thinking?

It’s a way of thinking about numbers in the real world, which are usually imprecise estimates. If someone asks how old you are, how warm it is outside, how long it takes to drive to the airport – these are generally answered with what I call “ish” numbers, and that’s very different from the way we use and learn numbers in school.

In the book I share an example of a multiple-choice question from a nationwide exam where students are asked to estimate the sum of two fractions: 12/13 + 7/8. They’re given four choices for the closest answer: 1, 2, 19, or 21. Each of the fractions in the question is very close to 1, so the answer would be 2 – but the most common answer 13-year-olds gave was 19. The second most common was 21.

I’m not surprised, because when students learn fractions, they often don’t learn to think conceptually or to consider the relationship between the numerator or denominator. They learn rules about creating common denominators and adding or subtracting the numerators, without making sense of the fraction as a whole. But stepping back and judging whether a calculation is reasonable might be the most valuable mathematical skill a person can develop.

But don’t you also risk sending the message that mathematical precision isn’t important?

I’m not saying precision isn’t important. What I’m suggesting is that we ask students to estimate before they calculate, so when they come up with a precise answer, they’ll have a real sense for whether it makes sense. This also helps students learn how to move between big-picture and focused thinking, which are two different but equally important modes of reasoning.

Some people ask me, “Isn’t ‘ishing’ just estimating?” It is, but when we ask students to estimate, they often groan, thinking it’s yet another mathematical method. But when we ask them to “ish” a number, they're more willing to offer their thinking.

Ishing helps students develop a sense for numbers and shapes. It can help soften the sharp edges in mathematics, making it easier for kids to jump in and engage. It can buffer students against the dangers of perfectionism, which we know can be a damaging mindset. I think we all need a little more ish in our lives.

You also argue that mathematics should be taught in more visual ways. What do you mean by that?

For most people, mathematics is an almost entirely symbolic, numerical experience. Any visuals are usually sterile images in a textbook, showing bisecting angles, or circles divided into slices. But the way we function in life is by developing models of things in our minds. Take a stapler: Knowing what it looks like, what it feels and sounds like, how to interact with it, how it changes things – all of that contributes to our understanding of how it works.

There’s an activity we do with middle-school students where we show them an image of a 4 x 4 x 4 cm cube made up of smaller 1 cm cubes, like a Rubik’s Cube. The larger cube is dipped into a can of blue paint, and we ask the students, if they could take apart the little cubes, how many sides would be painted blue? Sometimes we give the students sugar cubes and have them physically build a larger 4 x 4 x 4 cube. This is an activity that leads into algebraic thinking.

Some years back we were interviewing students a year after they’d done that activity in our summer camp and asked what had stayed with them. One student said, “I’m in geometry class now, and I still remember that sugar cube, what it looked like and felt like.” His class had been asked to estimate the volume of their shoes, and he said he’d imagined his shoes filled with 1 cm sugar cubes in order to solve that question. He had built a mental model of a cube.

When we learn about cubes, most of us don’t get to see and manipulate them. When we learn about square roots, we don’t take squares and look at their diagonals. We just manipulate numbers.

I wonder if people consider the physical representations more appropriate for younger kids.

That’s the thing – elementary school teachers are amazing at giving kids those experiences, but it dies out in middle school, and by high school it’s all symbolic. There’s a myth that there’s a hierarchy of sophistication where you start out with visual and physical representations and then build up to the symbolic. But so much of high-level mathematical work now is visual. Here in Silicon Valley, if you look at Tesla engineers, they're drawing, they're sketching, they're building models, and nobody says that's elementary mathematics.

There’s an example in the book where you’ve asked students how they would calculate 38 x 5 in their heads, and they come up with several different ways of arriving at the same answer. The creativity is fascinating, but wouldn’t it be easier to teach students one standard method?

A depiction of various ways to calculate 38 x 5, numerically and visually. | Courtesy Jo Boaler

That narrow, rigid version of mathematics where there’s only one right approach is what most students experience, and it’s a big part of why people have such math trauma. It keeps them from realizing the full range and power of mathematics. When you only have students blindly memorizing math facts, they’re not developing number sense. They don’t learn how to use numbers flexibly in different situations. It also makes students who think differently believe there’s something wrong with them.

When we open mathematics to acknowledge the different ways a concept or problem can be viewed, we also open the subject to many more students. Mathematical diversity, to me, is a concept that includes both the value of diversity in people and the diverse ways we can see and learn mathematics. When we bring those forms of diversity together, it’s powerful. If we want to value different ways of thinking and problem-solving in the world, we need to embrace mathematical diversity.

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The Algebra Problem: How Middle School Math Became a National Flashpoint

Top students can benefit greatly by being offered the subject early. But many districts offer few Black and Latino eighth graders a chance to study it.

The arms of a student are seen leaning on a desk. One hand holds a pencil and works on algebra equations.

By Troy Closson

From suburbs in the Northeast to major cities on the West Coast, a surprising subject is prompting ballot measures, lawsuits and bitter fights among parents: algebra.

Students have been required for decades to learn to solve for the variable x, and to find the slope of a line. Most complete the course in their first year of high school. But top-achievers are sometimes allowed to enroll earlier, typically in eighth grade.

The dual pathways inspire some of the most fiery debates over equity and academic opportunity in American education.

Do bias and inequality keep Black and Latino children off the fast track? Should middle schools eliminate algebra to level the playing field? What if standout pupils lose the chance to challenge themselves?

The questions are so fraught because algebra functions as a crucial crossroads in the education system. Students who fail it are far less likely to graduate. Those who take it early can take calculus by 12th grade, giving them a potential edge when applying to elite universities and lifting them toward society’s most high-status and lucrative professions.

But racial and economic gaps in math achievement are wide in the United States, and grew wider during the pandemic. In some states, nearly four in five poor children do not meet math standards.

To close those gaps, New York City’s previous mayor, Bill de Blasio, adopted a goal embraced by many districts elsewhere. Every middle school would offer algebra, and principals could opt to enroll all of their eighth graders in the class. San Francisco took an opposite approach: If some children could not reach algebra by middle school, no one would be allowed to take it.

The central mission in both cities was to help disadvantaged students. But solving the algebra dilemma can be more complex than solving the quadratic formula.

New York’s dream of “algebra for all” was never fully realized, and Mayor Eric Adams’s administration changed the goal to improving outcomes for ninth graders taking algebra. In San Francisco, dismantling middle-school algebra did little to end racial inequities among students in advanced math classes. After a huge public outcry, the district decided to reverse course.

“You wouldn’t think that there could be a more boring topic in the world,” said Thurston Domina, a professor at the University of North Carolina. “And yet, it’s this place of incredibly high passions.”

“Things run hot,” he said.

In some cities, disputes over algebra have been so intense that parents have sued school districts, protested outside mayors’ offices and campaigned for the ouster of school board members.

Teaching math in middle school is a challenge for educators in part because that is when the material becomes more complex, with students moving from multiplication tables to equations and abstract concepts. Students who have not mastered the basic skills can quickly become lost, and it can be difficult for them to catch up.

Many school districts have traditionally responded to divergent achievement levels by simply separating children into distinct pathways, placing some in general math classes while offering others algebra as an accelerated option. Such sorting, known as tracking, appeals to parents who want their children to reach advanced math as quickly as possible.

But tracking has cast an uncomfortable spotlight on inequality. Around a quarter of all students in the United States take algebra in middle school. But only about 12 percent of Black and Latino eighth graders do, compared with roughly 24 percent of white pupils, a federal report found .

“That’s why middle school math is this flashpoint,” said Joshua Goodman, an associate professor of education and economics at Boston University. “It’s the first moment where you potentially make it very obvious and explicit that there are knowledge gaps opening up.”

In the decades-long war over math, San Francisco has emerged as a prominent battleground.

California once required that all eighth graders take algebra. But lower-performing middle school students often struggle when forced to enroll in the class, research shows. San Francisco later stopped offering the class in eighth grade. But the ban did little to close achievement gaps in more advanced math classes, recent research has found.

As the pendulum swung, the only constant was anger. Leading Bay Area academics disparaged one another’s research . A group of parents even sued the district last spring. “Denying students the opportunity to skip ahead in math when their intellectual ability clearly allows for it greatly harms their potential for future achievement,” their lawsuit said.

The city is now back to where it began: Middle school algebra — for some, not necessarily for all — will return in August. The experience underscored how every approach carries risks.

“Schools really don’t know what to do,” said Jon R. Star, an educational psychologist at Harvard who has studied algebra education. “And it’s just leading to a lot of tension.”

In Cambridge, Mass., the school district phased out middle school algebra before the pandemic. But some argued that the move had backfired: Families who could afford to simply paid for their children to take accelerated math outside of school.

“It’s the worst of all possible worlds for equity,” Jacob Barandes, a Cambridge parent, said at a school board meeting.

Elsewhere, many students lack options to take the class early: One of Philadelphia’s most prestigious high schools requires students to pass algebra before enrolling, preventing many low-income children from applying because they attend middle schools that do not offer the class.

In New York, Mr. de Blasio sought to tackle the disparities when he announced a plan in 2015 to offer algebra — but not require it — in all of the city’s middle schools. More than 15,000 eighth graders did not have the class at their schools at the time.

Since then, the number of middle schools that offer algebra has risen to about 80 percent from 60 percent. But white and Asian American students still pass state algebra tests at higher rates than their peers.

The city’s current schools chancellor, David Banks, also shifted the system’s algebra focus to high schools, requiring the same ninth-grade curriculum at many schools in a move that has won both support and backlash from educators.

And some New York City families are still worried about middle school. A group of parent leaders in Manhattan recently asked the district to create more accelerated math options before high school, saying that many young students must seek out higher-level instruction outside the public school system.

In a vast district like New York — where some schools are filled with children from well-off families and others mainly educate homeless children — the challenge in math education can be that “incredible diversity,” said Pedro A. Noguera, the dean of the University of Southern California’s Rossier School of Education.

“You have some kids who are ready for algebra in fourth grade, and they should not be denied it,” Mr. Noguera said. “Others are still struggling with arithmetic in high school, and they need support.”

Many schools are unequipped to teach children with disparate math skills in a single classroom. Some educators lack the training they need to help students who have fallen behind, while also challenging those working at grade level or beyond.

Some schools have tried to find ways to tackle the issue on their own. KIPP charter schools in New York have added an additional half-hour of math time to many students’ schedules, to give children more time for practice and support so they can be ready for algebra by eighth grade.

At Middle School 50 in Brooklyn, where all eighth graders take algebra, teachers rewrote lesson plans for sixth- and seventh-grade students to lay the groundwork for the class.

The school’s principal, Ben Honoroff, said he expected that some students would have to retake the class in high school. But after starting a small algebra pilot program a few years ago, he came to believe that exposing children early could benefit everyone — as long as students came into it well prepared.

Looking around at the students who were not enrolling in the class, Mr. Honoroff said, “we asked, ‘Are there other kids that would excel in this?’”

“The answer was 100 percent, yes,” he added. “That was not something that I could live with.”

Troy Closson reports on K-12 schools in New York City for The Times. More about Troy Closson

Top 10 Challenges to Teaching Math and Science Using Real Problems

Nine in ten educators believe that using a problem-solving approach to teaching math and science can be motivating for students, according to an EdWeek Research Center survey.

But that doesn’t mean it’s easy.

Teachers perceive lack of time as a big hurdle. In fact, a third of educators—35 percent—worry that teaching math or science through real-world problems—rather than focusing on procedures—eats up too many precious instructional minutes.

Other challenges: About another third of educators said they weren’t given sufficient professional development in how to teach using a real-world problem-solving approach. Nearly a third say reading and writing take priority over STEM, leaving little bandwidth for this kind of instruction. About a quarter say that it’s tough to find instructional materials that embrace a problem-solving perspective.

Nearly one in five cited teachers’ lack of confidence in their own problem solving, the belief that this approach isn’t compatible with standardized tests, low parent support, and the belief that student behavior is so poor that this approach would not be feasible.

The nationally representative survey included 1,183 district leaders, school leaders, and teachers, and was conducted from March 27 to April 14. (Note: The chart below lists 11 challenges because the last two on the list—dealing with teacher preparation and student behavior—received the exact percentage of responses.)

Trying to incorporate a problem-solving approach to tackling math can require rethinking long-held beliefs about how students learn, said Elham Kazemi, a professor in the teacher education program at the University of Washington.

Most teachers were taught math using a procedural perspective when they were in school. While Kazemi believes that approach has merit, she advocates for exposing students to both types of instruction.

Many educators have “grown up around a particular model of thinking of teaching and learning as the teacher in the front of the room, imparting knowledge, showing kids how to do things,” Kazemi said.

To be sure, some teachers have figured out how to incorporate some real-world problem solving alongside more traditional methods. But it can be tough for their colleagues to learn from them because “teachers don’t have a lot of time to collaborate with one another and see each other teach,” Kazemi said.

What’s more, there are limited instructional materials emphasizing problem solving, Kazemi said.

Though that’s changing, many of the resources available have “reinforced the idea that the teacher demonstrates solutions for kids,” Kazemi said.

Molly Daley, a regional math coordinator for Education Service District 112, which serves about 30 districts near Vancouver, Wash., has heard teachers raise concerns that teaching math from a problem-solving perspective takes too long—particularly given the pressure to get through all the material students will need to perform well on state tests.

Daley believes, however, that being taught to think about math in a deeper way will help students tackle math questions on state assessments that may look different from what they’ve seen before.

“It’s myth that it’s possible to cover everything that will be on the test,” as it will appear, she said. “There’s actually no way to make sure that kids have seen every single possible thing the way it will show up. That’s kind of a losing proposition.”

But rushing through the material in a purely procedural way may actually be counterproductive, she said.

Teachers don’t want kids to “sit down at the test and say, ‘I haven’t seen this and therefore I can’t do it,’” Daley said. “I think a lot of times teachers can unintentionally foster that because they’re so urgently trying to cover everything. That’s where the kind of mindless [teaching] approaches come in.”

Teachers may think to themselves: “’OK, I’m gonna make this as simple as possible, make sure everyone knows how to follow the steps and then when they see it, they can follow it,” Daley said.

But that strategy might “take away their students’ confidence that they can figure out what to do when they don’t know what to do, which is really what you want them to be thinking when they go to approach a test,” Daley said.

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5 Best Ways to Use Maths for Kids

Isn’t math everywhere but sometimes it can be hard for kids to apply math knowledge in real life. they might be able to understand the concept but might not know how we will use it. real-life application is important for such reasons. real-life application makes the child strong at math and independent and confident since they know what they are doing.

Give them problems and they will solve it using math !! make them a problem solver

Table of Content

Ways To Use Maths

Math in kitchen, math in shopping, math in traveling, math in sports and games, math in home projects.

Here are a few ways to apply maths in daily life, other than math skills children will also be able to develop other basic skills. these ways don’t take much effort from the child and make them stronger in math.

$Math-in-Kitchen$

Measurements : Have kids measure ingredients, double or halve recipes, and convert units (e.g., cups to ounces). (ask If a recipe is asking for 2 cups of flour, but you want to make half of the recipe, how much flour do you need?”)

Fractions: Use cutting pizza or cake to explain fractions. (ask what is the fraction after eating 2 slices of pizza out of 12)

Time Management: Calculate cooking times and set timers. (ask how much more time it takes to make a cake as compared to a salad)

Ratio: explain ratios by cutting down measurements (the recipe is for 6 people but I want to make it for 3 people)

Skills Applied – Cooking Skills

$Math-in-Shopping$

Pocket money: Give kids a budget and let them plan a shopping list and ask about the savings later (ask if 10$ and each toffee cost you 2$ then how many did you buy)

Price Comparisons : Compare prices per unit (e.g., per ounce, per piece) to find the best deals. (what will be the price of this shirt after a 30% discount)

Change Calculation: Practice counting money and calculating change. (the toy costed you 26$ and you gave a 50$ note how much will you get in return?)

Skills Applied – Money Management Skills

$Math-in-travelling$

Distance and Time: Calculate distances on maps and estimate travel times.(we have reached 60% percent of our journey how much more left in km?)

Speed: Discuss speed (e.g., if we travel at 60 mph, how long will it take to travel 120 miles?).

Fuel Costs: Estimate fuel costs for trips based on mileage and gas prices.

Skills Applied – Travel Experience

Scores and Statistics: Keep track of scores and calculate averages. (calculate the average run needed to win)

Probability: Discuss probabilities using dice and card games.(who is more probable to win?)

Geometry: Analyze angles and shapes in sports fields or playground equipment.

Skills Applied – Learning Sports

$Math-in-DIY-Projects$

DIY Projects: Plan and execute small projects like building birdhouses or shelves, involving measuring and calculating dimensions. (The paper needs to be cut exactly at a 45 degree angle )

Energy Consumption: Track and graph household energy use.

Skills Applied – Creative thinking skills

With these practices child’s mental math will be better than ever!!

Real Life Applications of Mathematics
Real Life Application of Maths In Engineering
Real Life Applications Of Real Numbers

FAQs on Fun Ways Kids Use Math Every Day

What are math activities in real life.

Math is used every day in our lives. whether it cooking, shopping, exercising or even sleeping. There are a lot of daily math activities we do throughout the day and sometimes we even don’t realize it.

Can cooking and baking help kids learn math?

Yes of course! cooking and baking can help you develop math skills, but only if you do it in the right way.

How can parents encourage math learning in everyday activities?

If your child is not motivated enough than you can always make math fun for them which will make them intersted to do math some of the activites are mentioned above.

Can learning math be fun?

It depends on your learning method if you find cooking fun then you can learn math through it. There are so many ways of learning math. Find your way of learning and then learning math will be fun then ever.

Why is math so useful?

Math has played vital role in what we have today. Math is tool for logical reasoning and problem solving. It can prove concepts which have never been prove.

Give them problems and they will solve it using maths!! make them a problem solver.

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Kindergarten Math is Often Too Basic. Here’s Why That’s a Problem

This article was originally published in The Hechinger Report.

ASTON, Pa.— In Jodie Murphy’s kindergarten class, math lessons go beyond the basics of counting and recognizing numbers.

On a recent morning, the children used plastic red and yellow dots for a counting exercise: One student tossed the coin-sized dots onto a cookie sheet while another hid her eyes. The second student then opened her eyes, counted up the dots and picked the corresponding number from a stack of cards.

The dots showed up again a few minutes later in a more complex task. Murphy set a two-minute timer, and students counted as many dot arrays as they could, adding or taking away dots to match a corresponding written number. Four dots next to a printed number 6, for example, meant that students had to draw in two extra dots — an important precursor to learning addition.

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Kindergarten may be math’s most important year — it lays the groundwork for understanding the relationship between number and quantity and helps develop “number sense,” or how numbers relate to each other, experts and researchers say.

But too often teachers spend that crucial year reinforcing basic information students may already know. Research shows that many kindergarteners learn early on how to count and recognize basic shapes — two areas that make up the majority of kindergarten math content. Though basic math content is crucial for students who begin school with little math knowledge, a growing body of research argues more comprehensive kindergarten math instruction that moves beyond counting could help more students become successful in math later on.

Because so many students nationally are struggling in math — a longstanding challenge made worse by remote schooling during the pandemic — experts and educators say more emphasis needs to be put on foundational, early childhood math. But for a variety of reasons, kindergarten often misses the mark: Math takes a backseat to literacy, teachers are often unprepared to teach it, and appropriate curriculum, if it exists at all, can be scattershot, overly repetitive — or both.

Manipulating numbers in different ways, part of a supplemental math curriculum for Murphy’s whole class at Hilltop Elementary in this suburb of Philadelphia, is an attempt to address those problems. In an effort to improve math achievement district-wide, all elementary students in the Chichester School District get an extra 30-minute daily dose of math. In kindergarten, the extra time is spent on foundational skills like understanding numbers and quantity, but also the basics of addition and subtraction, said Diana Hanobeck, the district’s director of curriculum and instruction.

Chichester district leaders say implementing the intervention, called SpringMath , along with other steps that include hiring a math specialist for each school, has brought urgent attention to students’ math achievement by bringing more students to mastery — and a lot of that has to do with how much students are learning in kindergarten. Student math achievement, which dropped to a low of 13.5 percent of students proficient or advanced during the pandemic, has more than doubled across grades since the intervention began, although still below the state average. Last spring, 47 percent of the district’s fourth graders were proficient or advanced in math on the Pennsylvania System of School Assessment test.

“The intervention is very targeted by skill and gives teachers data for each student,” said Hanobeck. “We are seeing it close gaps for students, and they are more able to access elementary school math.”

Murphy, the kindergarten teacher, said that while some students arrive at school able to do “rote counting,” others arrive with no prior knowledge or a very limited understanding of numbers and counting. The interventions have improved all students’ accuracy and fluency in more complex tasks, such as being able to count up or down from a number like 16 or 20, and adding and subtracting numbers up to 5.

“It used to take all year for some students to count on from different starting points, that’s actually really hard for kids to do,” Murphy said. “Students are meeting their goals far faster now. We are moving on, but also moving deeper.”

That deep thought is important, even in the earliest grades. Kindergarten math proficiency is especially predictive of future academic success in all subjects including reading, research has shown. In one study, students’ number competence in kindergarten — which includes the ability to understand number quantities, their relationships to each other, and the ability to join and separate sets of numbers, like 4 and 2 making 6 — presaged mathematical achievement in third grade, with greater number competence leading to higher math achievement.

It’s also the time when learning gaps between students are at their smallest, and it’s easier to put all students on equal footing. “Kindergarten is crucial,” said University of Oregon math education researcher Ben Clarke. “It’s well-documented in the research literature that gaps start early, grow over time and essentially become codified and very hard to remediate.”

But the math content commonly found in kindergarten — such as counting the days on a calendar — is often embedded within a curriculum “in which the teaching of mathematics is secondary to other learning goals,” according to a report from the National Academies of Science. “Learning experiences in which mathematics is a supplementary activity rather than the primary focus are less effective” in building student math skills than if math is the main goal, researchers wrote.

The math students are taught in kindergarten often progresses no further than basic counting and shapes. In a 2013 study , researcher and University of Colorado Boulder associate professor Mimi Engel found that students who spent more time on the advanced concepts in kindergarten learned more math. Engel hypothesizes that exposure to more advanced content in kindergarten may help students in later grades when content grows more complex.

“We want some amount of repetition across grades in content,” Engel said. “There’s variation in kids’ skill sets when they start kindergarten, and, as a teacher, there are a number of reasons why you want to start with the basics, and scaffold instruction. But what I’m interested in is: when does repetition become redundancy?”

According to researcher Amanda VanDerHeyden, founder of SpringMath, breaking numbers apart and putting them back together and understanding how numbers relate to each other does more to help develop kindergarteners’ mathematical thinking than counting alone. Students should move from using concrete objects to model problems, to using representations of those objects and then to numbers in the abstract — like understanding that the number 3 is a symbol for three objects.

To improve students’ math skills, some schools and districts have recently upgraded the math curriculum and materials teachers use, so they are able to build increasingly complex skills in an organized, orderly way.

Kindergarteners in Hailey Lang’s classroom at Dr. William Burrus Elementary School in Hendersonville, Tennessee, were recently counting penguins — a digital whiteboard showed a photo of a mother penguin with seven fuzzy babies in tow.

“Can we make a math drawing about this picture? No details, you can just use little circles,” Lang said. Students drew one big circle and seven smaller circles on their papers to represent the penguins. Then they translated the circles into a number sentence: 1 (big circle) + 7 (small circles) = 8.

The lesson is new to students this year since they adopted the Eureka Math curriculum. It’s what Sumner County Superintendent Scott Langford calls “high-quality” instructional material, with lessons that move students beyond simply counting objects like penguins. Students look at penguins in a picture, translate them into representational circle drawings, then finally move on to their abstract number quantities.

Sumner County elementary coordinator Karen Medana said she appreciates the fact that the curriculum offers explicit guidance for teachers and builds on a sequence of skills.

One reason for redundancy in kindergarten math may be that classrooms lack cohesive materials that progress students through skills in an orderly way. A 2023 report from the Center for Education Market Dynamics showed that only 36 percent of elementary schools use high-quality instructional materials, as defined by EdReports, a nonprofit organization that evaluates curricula for rigor, coherence and usability. Eureka Math is one of several math programs that meet EdReports’ standards.

Often teachers are left to gather their own math materials outside the school’s curriculum. The Brookings Institution reports that large numbers of teachers use a district-approved curriculum as “one resource among many.” Nearly all teachers say they gather resources from the internet and sites like Teachers Pay Teachers — meaning what students learn varies widely, not only from district to district, but from classroom to classroom.

What students learn might not even be aligned from one grade to another. In a new, unpublished paper still in revision, researcher Engel found “notable inconsistencies” between pre-K and kindergarten classroom math content and how it is taught in New York City schools. Engel said results suggest that in many classrooms, kindergarten math might be poorly aligned with both pre-K and elementary school.

When teachers have access to well-aligned materials, students may learn more. At Marcus Hook Elementary, a Title I elementary school in the Chichester District, kindergarten teacher Danielle Adler’s students were deep into first grade addition, using numbers up to 12. They had already completed all the SpringMath kindergarten math skills in March, so she let them keep going.

“In the past we did focus more on counting, recognizing numbers and counting numbers,” Adler said, “But over the last three years I’ve seen the kids’ skills grow tremendously. Not only what they’re expected to do, but what they’re capable of doing has grown.”

What kindergarteners are expected to do at school has changed dramatically over the last 30 years, including more time spent on academic content. Adler and other kindergarten teachers agree that they hold higher expectations for today’s students, spend more time on teacher-directed instruction and substantially less time on “art, music, science and child-selected activities.”

Some worry that increasing time spent on academic subjects like math, and pushing kindergarten students beyond the basics of numbers and counting, will be viewed as unpleasant “work” that takes away from play-based learning and is just not appropriate for 5- and 6-year-olds, some of whom are still learning how to hold a pencil.

Engel said kindergarteners can be taught more advanced content and are ready to learn it. But it should be taught using practices shown to work for young children, including small group work, hands-on work with objects such as blocks that illustrate math concepts, and learning through play.

Mathematician John Mighton, the founder of the curriculum JUMP Math, said it’s a mistake to believe that evidence-based instructional practices must be laborious and dull to be effective. He has called on adults to think more like children to make more engaging math lessons.

“Children love repetition, exploring small variations on a theme and incrementally harder challenges much more than adults do,” he wrote — all practices supported by evidence to increase learning.

Simple lessons, when done well, can teach complex ideas and get children excited.

“People say kids don’t have the attention,” to learn more advanced concepts, he said, but he strongly believes that children have more math ability than adults give them credit for. Getting students working together, successfully tackling a series of challenges that build on each other, can create a kind of collective effervescence — a feeling of mutual energy and harmony that occurs when people work toward a common goal.

That energy overflowed in Adler’s classroom, for example, as students excitedly colored in graphs showing how many addition problems they got correct, and proudly showed off how the number correct had grown over time.

VanDerHeyden pointed out that, for young kids, much of a math intervention should look and feel like a game.

It’s often harder than it looks to advance kindergarten skills while keeping the fun — elementary teachers often say they have low confidence in their own abilities to do math or to teach it. Research suggests that teachers who are less confident in math might not pay enough attention to how students are learning, or even spend less time on math in class.

Teachers like Murphy have made some tweaks geared to engaging students. In class she calls SpringMath “math games,” and refers to timed fluency tests as “math races.” She even turned choosing a partner into a game, by spinning a wheel to see who students will get.

“We can do all these little things so they’re having fun while they’re learning,” Murphy said.

This story was originally published on The Hechinger Report , a nonprofit, independent news organization focused on inequality and innovation in education

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Step 1 - Understand the Problem. To help students understand the problem, I provided them with sample problems, and together we did five important things: read the problem carefully. restated the problem in our own words. crossed out unimportant information. circled any important information.
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The Algebra 1 course, often taught in the 9th grade, covers Linear equations, inequalities, functions, and graphs; Systems of equations and inequalities; Extension of the concept of a function; Exponential models; and Quadratic equations, functions, and graphs. Khan Academy's Algebra 1 course is built to deliver a comprehensive, illuminating, engaging, and Common Core aligned experience!
10 Super Fun Math Riddles for Kids! (with Answers)
10 Super Fun Math Riddles and Puzzles for Kids Ages 10+ (Answers Included!) A Post By: Anthony Persico. Some have been around for centuries, while are others are brand spanking new—but all have been selected as the most fun and engaging math riddles for those who love to challenge their problem-solving skills and have fun solving math puzzles ...
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K5 Learning offers free worksheets, flashcards and inexpensive workbooks for kids in kindergarten to grade 5. Become a member to access additional content and skip ads. Free kindergarten to grade 6 math worksheets, organized by grade and topic. Skip counting, addition, subtraction, multiplication, division, rounding, fractions and much more.
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Here are the steps to problem-solving: . Identify the problem. Just stating the problem out loud can make a big difference for kids who are feeling stuck. Help your child state the problem, such as, "You don't have anyone to play with at recess," or "You aren't sure if you should take the advanced math class."
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Feature Red Herrings: Including unnecessary information introduces another problem-solving element, overwhelming many elementary students. A key to differentiated instruction, word problems that students can relate to and contextualize will capture interest more than generic and abstract ones. Final thoughts about math word problems
Brilliant
Brilliant - Build quantitative skills in math, science, and computer science with hands-on, interactive lessons. ... We make it easy to stay on track, see your progress, and build your problem-solving skills one concept at a time. Stay motivated. Form a real learning habit with fun content that's always well-paced, game-like progress tracking ...
100 Math Riddles for Kids (and Grown-Ups Too!)
Math riddles can be a fun way to learn and practice math, which can increase motivation. Support collaboration. If students must solve a problem in groups, they'll practice working together and relying on each other's unique approaches and thinking styles. Whatever the reason, check out these 100 math riddles to challenge every student.
Math Word Problem Worksheets
Grade 3 word problems worksheets. Simple addition word problems (numbers under 100) Addition in columns (numbers under 1,000) Mental subtraction. Subtraction in columns (2-3 digits) Mixed addition and subtraction. Simple multiplication (1-digit by 1 or 2-digit) Multiplying multiples of 10. Multiplication in columns.
Sixth grade math worksheets
K5 Learning offers free worksheets, flashcards and inexpensive workbooks for kids in kindergarten to grade 5. Become a member to access additional content and skip ads. 6th grade math worksheets: Place value & scientific notation, multiplication & division, fractions & decimals , factoring, proportions, exponents, integers, percents, geometry ...
The case for 'math-ish' thinking
It can help soften the sharp edges in mathematics, making it easier for kids to jump in and engage. It can buffer students against the dangers of perfectionism, which we know can be a damaging ...
The Algebra Problem: How Middle School Math Became a National
Around a quarter of all students in the United States take algebra in middle school. But only about 12 percent of Black and Latino eighth graders do, compared with roughly 24 percent of white ...
Top 10 Challenges to Teaching Math and Science Using Real Problems
Teachers perceive lack of time as a big hurdle. In fact, a third of educators—35 percent—worry that teaching math or science through real-world problems—rather than focusing on procedures ...
5 Best Ways to Use Maths for Kids
DIY Projects: Plan and execute small projects like building birdhouses or shelves, involving measuring and calculating dimensions. (The paper needs to be cut exactly at a 45 degree angle ) Energy Consumption: Track and graph household energy use. Skills Applied - Creative thinking skills. With these practices child's mental math will be ...
Kindergarten Math is Often Too Basic. Here's Why That's a Problem
ASTON, Pa.— In Jodie Murphy's kindergarten class, math lessons go beyond the basics of counting and recognizing numbers. On a recent morning, the children used plastic red and yellow dots for ...