SamizdatMath

This is the best investigation you can find anywhere which links exponential growth with paper folding. It includes background information about the investigation, and uses charts and tables to keep track of how tall a piece of paper would be if you folded it in half up to 60 times. The activity works with both customary and metric units and has answer keys for both. This investigation also looks at the formula that was derived by Britney Gallivan, a high school junior who actually proved that

This is a set of activities that uses the raw data from each state in the 2016 United States Presidential Election, including the number of votes for each candidate, the number of "eligible" voters and the number of voters who "did not vote." What students will find out that if "did not vote" was a candidate, it would have "won" by one of the largest landslides in history. This is based on data used on the following website: https://brilliantmaps.com/did-not-vote/ The first activity explains som

Note: There is now a video tutorial that goes with this activity: Division With Remainders: Just Do It (RIGHT!) Your students are "learning" about division, and if you're using a really, really cruddy curriculum, then they probably all sound like this: "I have 24 blah blah blahs which I'm packing into cases of (choose some divisor of 24.) How many cases will I be able to make. This, my friends, is a lackadaisical and churlish approach to teaching students about solving problems with division.

This is a fun little activity that you can do in a class period, or just give for homework, and it will get your kids to think carefully about fractions, most likely beyond the junk that is in whatever textbook you are using. It would also be excellent as an assessment of your students’ basic understanding of how fractions work. The idea is this: do your students have a basic understanding of how fractions work? Do they REALLY? This is how you do it in 5 questions. In questions 1 and 2, we look

I know you all love "Task Cards" - so I made these for you, but at the same time, I had to get "snarky." Forgive me..... See all those stoopid questions that show up on Facebook, Instagram, PInterest, Friendster, Tumblr, Twitter, Woof, etc? The ones where they tell you to calculate some easy-peasy problem and then 83% get the wrong answer? Wouldn't that make a great activity for reviewing order of operations, a.k.a. PEMDAS????? So I collected a whole bunch of these, spread them over a few pag

This is one of an occasional series of mondo-tough problems that use small numbers (or no numbers at all!) Here’s how it works: we all teach our students how to take a group of numbers and calculate the range, mean, median and mode. Seems pretty simple, and our students tired of it damned quickly. Can you blame them? It’s just “do what the teacher told me to do, and then write the answer here...” kind of busywork. But what if we were to switch the tables on our students: let’s give them t

First of all, let’s get one thing out of the way: Archimedes never used the Greek letter “pi” when he used it to calculate the area and circumference of a circle. No, never; so just by reading this blurb you've learned something new! The point of this activity is threefold: the first is to show that as you double the diameter of a circle, the area of that circle would quadruple. That’s a very important concept, because many of your students have only experienced relationships where if

How much Cash is in that Stash? If you've ever struggled with finding a fun and effective way to teach the distributive property of multiplication over addition and subtraction, this is the activity for you. Using the example of a suitcase full of dollar bills, students will learn how to effectively count the cash in groups by dividing up the cash into smaller rectangular arrays, whose products can be combined to find a solution. This activity includes a sample problem, specific teaching instru

Here’s the idea: your students are learning about coordinate geometry, so you teach them hoe to find the x and y axis, they plot a few points, maybe you play some lame games, and then they’re off and graphing some equations. Bo-ring! These activities teach students about the conventions of coordinate graphing (they are not “rules”, they are “conventions”) and then applies them to the practice of solving actual problems, from delivering pizza to making maps to guide first responders. The activiti

What goes better with equivalent fractions than ZOMBIES! And what goes better with zombies than Valentine's Day? Each of these ghouls represents a fraction; surrounding them are equivalent fractions with heart-shaped zombie brains that are missing a numerator or denominator. Alas, one of them is a ZOMBIE and cannot be completed! For example, if there is a fraction 1/3 and ?/5 is one of the choices, it can't be completed, because 3rds can't be turned into 5ths. SO MUCH FUN your kids will love i

Do you give summer math work to your students? If so, I imagine it's probably a bunch of those cruddy worksheets that you downloaded off the InterWeb, printed out and told your students to complete for next year's teacher by the beginning of school. You know that your students won't use these, and will more than likely wait to the last minute to rush through them and do a crappo job. So what's the alternative? Well, you could send home this pack o' stuff: there's all kinds of fun stuff to keep

For your enjoyment & edification. Solutions coming soon.....

Equivalent Fractions! Equivalent Fractions? Equivalent Fractions ---- Equivalent Fraction Practice / Equivalent Fraction Problems..... Okay, I know this appears to be a shameless attempt to cash in on the Christmas Holiday, but I am deeply concerned that many of you loved the idea of your students knowing when they can and when they cannot make an equivalent fraction. Why you need this activity: many of our students do something peculiar when they learn a new skill - they apply it to every case

These activities are centered around the idea of measuring and constructing pitched roofs. Depending on a building's cost, function and location, a roof can either have a very steep pitch (which would mean a very acute angle, like you would find on ski houses in the mountains) or an obtuse angle (like a house in the tropics where it rains a lot and the water has to run off slowly to prevent flooding.) These activities are designed for students to work on individually or in pairs: the first part

This activity features at least 1 Billion (that's 1,000,000,000) different long division problems. How did I do it? Answer: a very, very small font! All kidding aside, this is an incredibly expandable activity that has an unlimited number of puzzles, with each puzzle having several different solutions. Students start with a blank long division problem, with blanks left where the divisor and dividend should be. Some blanks are not too sophisticated: it may be a single digit divisor into a double

What goes better with equivalent fractions than ZOMBIES! Each of these ghouls represents a fraction; surrounding them are equivalent fractions that are missing a numerator or denominator. Alas, one of them is a ZOMBIE and cannot be completed! For example, if there is a fraction 1/3 and ?/5 is one of the choices, it can't be completed, because 3rds can't be turned into 5ths. SO MUCH FUN your kids will love it finding zombie fractions! Customer Tips: How to get TPT credit to use on future purch

Ben and Ilene are having an argument: they are looking at a number line with a 0 on one end, and 1 million on the other end. The question is: where would 1 thousand be? Ben & Ilene have different insights into the problem: Ben says that 1,000 is a large number and so is a million, so it must be close to that side. Ilene says that 1 thousand is much smaller than 1 million, and it belongs closer to 0. Is either of them correct, or is one of them "more correct" than the other? I've included 5 exam

It is difficult to show a use for multiplying fractions that seems both fun and real. In this activity, students learn about a "multi-ray" which changes the size of an object. When the multi-ray is set to more than 1, it is enlarged. When it is set to between 0 and 1, it is made smaller. This activity starts by teaching the concept of scaling by whole numbers, then scales a whole number by a fraction, then a fraction by a whole number, and finally a fraction by a fraction. This activity includes

Are you interested in developing your students' understanding of decimals and statistics using baseball? This activity focuses on the skills of computing and comparing batting averages, as well as seeing what effect a "hit" can have on a player's average; that is, a player with fewer "at bats" will get a bigger "bump" from a hit, than a player with many at bats. This activity encourages students to see that a single statistic cannot tell you everything about the quality of a baseball player.

Do you have pattern blocks? Traditionally, we know the triangles as sixths, rhombi as thirds and trapezoids as halves. But what if we changed this a bit? Suppose the trapezoid was not 1/2, but 1/4? What would that make the green triangles? What would "1" look like? If you want to deepen your students' understanding of fractions using manipulatives and having children work together on a very engaging and challenging set of tasks, then you'll want to buy this. This unit, complete with lesson pla