SamizdatMath

FACT: Students need more practice solving subtraction problems. FACT: This collection has lots of subtraction problems. FACT: Not all subtraction problems are the same: some are "take away," some are "let's compare one with another," some are "I have something and took away this, now I have this...." This is a collection of over 200 different "BIG Busy Bee Hive" puzzles where students practice subtraction in a context that is fun and thoughtful. That is, yes, they get lots of opportunities to do

FACT: Students need more practice solving subtraction problems. FACT: This collection has lots of subtraction problems. FACT: Not all subtraction problems are the same: some are "take away," some are "let's compare one with another," some are "I have something and took away this, now I have this...." This is a collection of over 200 different "Busy Bee Hive" puzzles where students practice subtraction in a context that is fun and thoughtful. That is, yes, they get lots of opportunities to do "ta

Description FACT: Students need more practice solving subtraction problems. FACT: This collection has lots of subtraction problems. FACT: Not all subtraction problems are the same: some are "take away," some are "let's compare one with another," some are "I have something and took away this, now I have this...." This is a collection of over 200 different "Busy Bee Hive" puzzles where students practice subtraction in a context that is fun and thoughtful. That is, yes, they get lots of opportuniti

Description FACT: Students need more practice solving subtraction problems. FACT: This collection has lots of subtraction problems. FACT: Not all subtraction problems are the same: some are "take away," some are "let's compare one with another," some are "I have something and took away this, now I have this...." This is a collection of over 200 different "Busy Bee Hive" puzzles where students practice subtraction in a context that is fun and thoughtful. That is, yes, they get lots of opportuniti

FACT: Students need more practice solving subtraction problems. FACT: This collection has lots of subtraction problems. FACT: Not all subtraction problems are the same: some are "take away," some are "let's compare one with another," some are "I have something and took away this, now I have this...." This is a collection of over 200 different "Busy Bee Hive" puzzles where students practice subtraction in a context that is fun and thoughtful. That is, yes, they get lots of opportunities to do "ta

Many, MANY years ago I had a student in a 7th grade math class who was working on some kind of assignment that required solving the problem 25 ÷ 8. He called me over and pointed out that there must be some kind of error in the problem, because 8 does not go into 25. Being the budding klugarsch that I was, I remarked that, in fact, 8 did “go into” 25 (if you mean how many times can you count up by 8s before getting past 25), but that it didn’t do so without leaving a remainder. Which got me thin

Here’s the problem with teaching any kind of technique in mathematics: once you have kids practice it, they discard all the other techniques they know, even if the ones they discard are faster, more efficient and more accurate. Such is the case with teaching “stacking” of addition problems. Sure, it’s a great skill to have, but is it always necessary? I say this: based on some statistic I ran, between 70 - 80% of all addition problems with two addends don’t need to be stacked. Yet we act as if

This is a rounding game I developed for a colleague at my school: I am a working teacher (as I have been for the past 37 years) so I know stuff. And here’s what I know: games are fun, learners like to play games, and games should exercise the learner’s mind in a variety of ways. Which is how I developed the “rounding” and “un-rounding” games. The “Rounding Game” is your basic bingo game: you turn over two cards, round off the number to the nearest ten, find that rounded number on the bingo board

GaOn is a multi-digit addition/subtraction strategy game that can be played in different ways. Players take turns selecting cards and attempt to form an equation that satisfies the conditions written on the challenge card. Includes game boards, challenge cards, recording sheets and detailed instructions. SamizdatMath does not use or endorse the use of "cutesy" clip art.

BY SPECIAL REQUEST! For those of you who enjoyed Coin KenKen and Ultra Coin KenKen, I know bring you TURBO COIN KENKEN: a 5 x 5 grid with half dollars, quarter dollars, dimes, nickels and pennies to arrange on a grid so that the values equal to the shaded in area, and all coins appear once in each column and row. 5 puzzles, 5 answer sheets. Happy Problem Solving to All!

79 89 99 119? 129? Take 2: 134 124 114 84? 74? Do your students struggle to count by 10s across 100? If they're doing mental math, then they probably will at one time or another. So why not help them practice this so they don't say things like "75, 85, 95, uh, uh, 105?" This is a "three-fer" - you get the group game "roller coaster" where a group of students compete cooperatively to count up and down by tens between a bottom and top number. For example, the first students says 78, the next one

This "product" is an exercise in the form of a "lightly" competitive game that uses addition and subtraction on the number line (which was invented in 1685 by the mathematician John Wallis) that students can play in any number of configurations (pairs, triplets, etc.) and in any number of ways (rolling a single die, rolling 2 dice, using the numbers individually or in combination, etc.) There are versions that use 3, 4, 5 and 6 rolls. There is a number line under each game for your students prac

Are you sick and tired of drilling & killing your kids on the combinations of 10 and just saying, "okay, there's nothing fun about this, so let's just move on." Sorry, I've got to call BS on that. Because learning combinations of 10 is also an opportunity for your students to do some problem solving, do some algebraic thinking, as well as make many, many mistakes. These are NOT worksheets! They are puzzles and are designed to be "hands on" and "manipulative." That is, your students will work w

This is NOT your typical "is this a prime or composite number, and if it is composite, show the prime factor" exercise. No, this is an activity that actually demonstrates how figuring out prime factors is linked to encrypting information securely. If you know about the Russian Postal Service puzzle, then you'll appreciate this. There are 10 different puzzles, and then a "DIY" where your students can make their own "prime puzzlers" to share with one another. If they're really good, send them to

Okay, you're teaching your kids how to do two and three column addition.... WHAT A SNOOZE! I promise you, this is going to be fun! Here's how it works: you've taught your students about regrouping/carrying in multi-column addition, and they've done a few problems and you want them to have a little more experience with it while doing some deep thinking. This is the activity for you! This collection of "ink blot addition puzzles" will engage your students in a completely different way, because

I KNOW this is going to come up on every search of the novel "The Outsiders," but don't blame me - it was Peggy Kaye who came up with this simple and easy division partitioning game where pairs of kids draw between 10 and 25 Xs on a piece of paper, then throw out anywhere from 1 to 5 fingers, add them (the fingers) together and use that as a divisor to partition the Xs into groups by circling them. The player with the fewest "outsiders" is declared the winner. Easy peasy, fun game, right? WRONG!

This is a collection of 9 different colorful Cuisenaire Rod "make the road" puzzles which challenges your students to cover a path using exactly one of each rod. Each one has a different colorful background. This is a great activity that your students can do independently during a work time or placed in a math center. There's a handy chart you can fill in with your students' names to keep track of which puzzles they've completed, with fillable form fields. There is also an option for students

This is one of a series of activities that helps children “break down” numbers. One of the things that I’ve noticed about mathematics curricula is that there is a lot of focus on putting numbers together, but not enough on breaking numbers apart. Perhaps it’s because breaking numbers apart is a lot harder to teach and learn; after all, addition is commutative, and it’s sort of fun, because you get more (except when you’re using negative numbers.) But in order for children to learn how to do thin

This is Max Forstat; she owns a building which has 4 apartments per floor. There are 6 floors in the building. She decides to number the apartments from 1 to 24, starting from the ground floor. Apartments 1 through 4 are on the first floor, 5 - 8 on the second, and so on. How would you figure out which floor each apartment is located? This activity gets students involved in performing division with and without remainders, and then using the remainder to determine the floor and location of the ap

This is a set of 48 different coin puzzles: 24 of them show a piggy bank, and the student adds up the total and records it. The other 24 show a piggy bank with a coin missing, and the total amount in the piggy bank; the student has to figure out the missing coin. Those are "missing addend" problems in that the student knows the partially filled amount and the total and has to find the missing piece. This is formatted both as individual "task cards" and worksheets - I'd prefer you use them as ta