For Sunday brunch, cut your bagel so the two halves are linked together like a chain.
— Steven Strogatz (@stevenstrogatz) May 25, 2014
Saturday, May 31, 2014
140: Topology Bagels - Two Rings
Can you cut your bagel so that you get two linked rings?
Friday, May 30, 2014
139: Largest Integer, part 2
After yesterday have to ask ... Is there a largest odd number that is not the sum of three composite odd numbers?
— James Tanton (@jamestanton) May 26, 2014
Thursday, May 29, 2014
138: Largest Integer
For example, 42 = 21 + 21, so it is not a candidate. 22 is a candidate because no pair of 9, 15, or 21 can equal 22.
As with many of Mr. Tanton's puzzles, there's a way to know that you are absolutely correct. Can you find the number and the explanation?
What is the largest even integer that cannot be written as the sum of two odd composite numbers?
— James Tanton (@jamestanton) May 25, 2014
Wednesday, May 28, 2014
137: McNuggets
What is the largest number of McNuggets you CAN'T get with some combination of 3-piece, 6-piece or 20-piece boxes?
Tuesday, May 27, 2014
136: Jeopardy!
Assuming that you get every question correct, and bet it all on the Daily Double, and the Daily Double happens at the most opportune time, and the Daily double is located in the absolute best place, how much can you win in the first round of Jeopardy?
And what is the best place for the Daily Double?
And the best time to get the Daily Double?
The prizes are twice as big when you get to the Double Jeopardy Round:
So let's keep this going ... how much can you theoretically win to this point?
In Final Jeopardy, you can bet it all ("Let it Ride", as gamblers say).
And what is the best place for the Daily Double?
And the best time to get the Daily Double?
The prizes are twice as big when you get to the Double Jeopardy Round:
So let's keep this going ... how much can you theoretically win to this point?
In Final Jeopardy, you can bet it all ("Let it Ride", as gamblers say).
Monday, May 26, 2014
135: Raising the Average
In a charter school of 400 students, the average score on a standardized test at the beginning of the year was 82%.
By the end of the first few months, 92 students couldn't take it anymore: the 9-hour days of which 8.5 hours were spent staring at computer screens, the required Saturday classes and the constant badgering over being quiet, walking dully in a single file, drill, drill, drill, drill, and drill, all seemingly in an effort to get them to drop out.
The 92 students, who were getting Ds and Fs, had a collective average of 60, which is why they were targeted.
In late October, Jay Matthews of the Washington Post interviews the principal for a Thanksgiving-themed piece in the paper and asked about the gains and improvements that the wonderful charter-school had been able to accomplish.
The principal did not mention that the students had not taken the test again or that the rise was simply because of the elimination of what he considered inferior students. Instead, the principal said proudly, "Our program is amazing. We have been able to raise their scores by _________ in just two months. If the City gives over some more public schools to our control, we'll be able to do more of this."
How much did scores rise because of the expulsion/removal of the 92 lower-scoring students?
By the end of the first few months, 92 students couldn't take it anymore: the 9-hour days of which 8.5 hours were spent staring at computer screens, the required Saturday classes and the constant badgering over being quiet, walking dully in a single file, drill, drill, drill, drill, and drill, all seemingly in an effort to get them to drop out.
The 92 students, who were getting Ds and Fs, had a collective average of 60, which is why they were targeted.
In late October, Jay Matthews of the Washington Post interviews the principal for a Thanksgiving-themed piece in the paper and asked about the gains and improvements that the wonderful charter-school had been able to accomplish.
The principal did not mention that the students had not taken the test again or that the rise was simply because of the elimination of what he considered inferior students. Instead, the principal said proudly, "Our program is amazing. We have been able to raise their scores by _________ in just two months. If the City gives over some more public schools to our control, we'll be able to do more of this."
How much did scores rise because of the expulsion/removal of the 92 lower-scoring students?
Sunday, May 25, 2014
134: Savings?
#unitratechat RT @hpatt27: Interesting how they delivered the numbers to support their message. #WCYDWT #mtbos
— Christopher (@Trianglemancsd) May 19, 2014
133: Concentric Circles
So Sayeth Mr Honner:
I wonder if it’s possible to find the angle between my sight-line and the central axis of the cylinder by comparing the centers of the various circles?I've got a hunch the relative size of the circles counts, too, but I haven't thought deeply about this yet.
Saturday, May 24, 2014
132: Cubes
If you've ever played with a Rubic's Cube, you know it's possible to divide a cube into 27 smaller cubes. Eight and sixty-four is pretty obvious, too.
Can you show how to divide a cube into other numbers of sub-cubes, numbers that aren't perfect cubic numbers?
Like 15? or 20?
Because you don't have enough awesome in your life, I present watermelon cubes.
Can you show how to divide a cube into other numbers of sub-cubes, numbers that aren't perfect cubic numbers?
Like 15? or 20?
Possible to divide a cube into 1, 8, and 27 cubes. Show how to also divide a cube into 20 or 15 sub cubes. Any other nmbrs under 27?
— James Tanton (@jamestanton) May 11, 2014
Because you don't have enough awesome in your life, I present watermelon cubes.
Friday, May 23, 2014
131: Traveling Salesman
from MathGIFs:
This is a visualization of the Traveling Salesman problem.
Let's simplify things a bit ...
Find the shortest route through the capitals of the six New England states.
This is a visualization of the Traveling Salesman problem.
"One of the most famous problems of math and computer science is the Traveling Salesman Problem. Given a list of n cities, what is the shortest tour that visits each city exactly once and returns back to the starting city? One of the reasons why this problem is so famous is that it is easy to understand the problem and incredibly hard to solve the problem. The animation above illustrates the steps a computer algorithm used to arrive at what we think is the shortest distance - 12,930 miles - needed to visit all 48 continental US capitals. (We used Google maps to use actual roads and highways when computing the distances between cities.) The best way to view the animation is to watch only one part of the US at a time, like the northeast. Then you can see how the web of paths works itself out into an efficient route."
Let's simplify things a bit ...
Find the shortest route through the capitals of the six New England states.
Thursday, May 22, 2014
130: Catching a Pass
So ... is this possible? Or is it a well-done fake?
Who has physics/math students that can analyze this: is this real? Can you catch your own pass? https://t.co/JWYzoNPS0t #mathchat #anyqs
— Max Ray (@maxmathforum) April 28, 2014
Wednesday, May 21, 2014
129: Helpers
If it takes me 60 minutes to cook dinner by myself, and 90 minutes if one of my kids is "helping" me, how long would it take her to do it herself?
— Matt Enlow (@CmonMattTHINK) May 10, 2014
Q10: Conventions
Question 10: What is the difference between a convention (such as PEMDAS) and a law (such as the distributive property)?
Tuesday, May 20, 2014
Monday, May 19, 2014
Q8 - Conversions
A simple question today.
Question 8: Create the equations that a website or a calculator might use.
Question 8: Create the equations that a website or a calculator might use.
Sunday, May 18, 2014
Q7 - The Mean and Hidden Information
Question 7: Most teachers use the mean to assign a grade, but this measure hides information. What information is hidden and what, if anything, should we do about it?
Saturday, May 17, 2014
Q6 - Catering the Party
Question 6: Catering the Party.
How many tables will be needed?
Friday, May 16, 2014
Q5 - Repeated Addition
Question 5: Multiplication is Just repeated Addition.
Explain why this statement is false, giving examples.
Thursday, May 15, 2014
Q4 - Ordering Numbers
Question 4: Organized list of numbers
Place these numbers in order from largest to smallest and predict the errors that some of your classmates might make.
Place these numbers in order from largest to smallest and predict the errors that some of your classmates might make.
Wednesday, May 14, 2014
Q3 - Invert and Multiply
Question 3: Invert and Multiply
You are told to “invert and multiply” to solve division problems with fractions. To the best of your understanding, explain why this works and when it works; include any situations for which this instruction doesn't work.
Tuesday, May 13, 2014
Q2 - Equivalence
The form is embedded after a jump. View this post directly to see it. We think it would be best if you point your students to this form and have them record their thoughts on each question BEFORE any class discussion, perhaps as a homework assignment the evening before. If they wish to change their thoughts afterwards, we would ask that they submit a new entry.
Question 1: Equivalence
"Solving problems typically requires finding equivalent statements that simplify the problem." Explain.
Question 1: Equivalence
"Solving problems typically requires finding equivalent statements that simplify the problem." Explain.
Monday, May 12, 2014
Q1 - Divide By Zero
Question 1: "You can't divide by zero". Explain why not.
To the best of your understanding, explain why you can't divide by zero, even though you can multiply by zero.
To the best of your understanding, explain why you can't divide by zero, even though you can multiply by zero.
Sunday, May 11, 2014
128: Which is bigger?
We'll just let this one speak for itself ...
Quick, which infinite sum is greater?
1/2 + 2/4 + 3/8 + 4/16 + 5/32 + 6/64 + 7/128 ...,
or
1/2 + 1/4 + 2/8 + 3/16 + 5/32 + 8/64 + 13/128 ...
— Matt Enlow (@CmonMattTHINK) April 29, 2014
Saturday, May 10, 2014
127: Consecutive Sums Are Squares
A Challenge from StandupMath:
Can you arrange the integers 1 to 17 so that each adjacent pair adds to a square number?
Can you arrange the integers 1 to 17 so that each adjacent pair adds to a square number?
@standupmaths: arrange integers 1 to 17 so that each adjacent pair adds to a square number #mathspuzzle”
— Christopher Rath (@Rathematician) September 24, 2013
Friday, May 9, 2014
126: Teachers - Balanced or Not?
Building on yesterday's ideas, we present this thought-bomb:
FiveThirtyEight had a graph on baseball teams, comparing the abilities of the players with a type of Winning percentage metric:
Teams to the right consisted of a few great players mixed with some average and below-average players - a big spread of abilities.
Teams to the left didn't have any superstars, but they had above-average players.
Which group of faculty would you think would make for a better school? The one with some GREAT teachers and some LOUSY teachers, or the one with only GOOD teachers?
Which school would you rather be enrolled in?
FiveThirtyEight had a graph on baseball teams, comparing the abilities of the players with a type of Winning percentage metric:
Teams to the right consisted of a few great players mixed with some average and below-average players - a big spread of abilities.
Teams to the left didn't have any superstars, but they had above-average players.
Which group of faculty would you think would make for a better school? The one with some GREAT teachers and some LOUSY teachers, or the one with only GOOD teachers?
Which school would you rather be enrolled in?
Thursday, May 8, 2014
125: Average Shmaverage
Assume a classroom where every grade has equal weight. Here are two sets of grades:
Student A (ave=80.0): 100, 100, 100, 0, 100
Student B (ave=80.2): 81, 80, 80, 80, 80
Questions:
Another set of grades, in sequence:
Student A: 25, 25, 50, 100, 100
Student B: 100, 100, 50, 25, 25
Same questions:
Examples from Step 1: Try Something.
Student A (ave=80.0): 100, 100, 100, 0, 100
Student B (ave=80.2): 81, 80, 80, 80, 80
Questions:
- Who has better mastery?
- Who will be better prepared for the next course?
- Which would you rather be?
Another set of grades, in sequence:
Student A: 25, 25, 50, 100, 100
Student B: 100, 100, 50, 25, 25
Same questions:
- Who has better mastery?
- Who will be better prepared for the next course?
- Which would you rather be?
Examples from Step 1: Try Something.
Wednesday, May 7, 2014
124: Dividing a Number by UmberN
Can you find a number such that,
if you move the leading digit to the units place of a number, i.e. 72 becomes 27 or 381 becomes 813, the original number is a factor or multiple of the new number? Oh, and not all digits are identical.
if you move the leading digit to the units place of a number, i.e. 72 becomes 27 or 381 becomes 813, the original number is a factor or multiple of the new number? Oh, and not all digits are identical.
- Can you find a two digit number that will work in this way?
- If you can't, was it because it can't happen?
- In his tweet, James Tanton claims that there are no three or four digit digit numbers that will work. He doesn't make a statement like that unless he has found some way to show it NEVER works. Can you find that rule?
There is no three-digit number abc divisible by bca. (Move first digit to end) No 4-digit number abcd divisible by bcda. Five? Six?
— James Tanton (@jamestanton) April 26, 2014
Tuesday, May 6, 2014
123: Binary Names
@MathCurmudgeon @crstn85 Great math question here: how many of these questions would you need to get right before you could ID the teacher?
— Bowen Kerins (@bowenkerins) April 25, 2014
Monday, May 5, 2014
122: Packing the Crates
There are ten boxes weighing 15, 13, 11, 10, 9, 8, 4, 2, 2, and 1 kgs. They are to be packed into three crates, 25 kg each.
How many different ways can this be done?
How many different ways can this be done?
New problem of the week just added to http://t.co/VbtHG8Lui3 #ukedchat
— Graham Andre' (@grahamandre) March 30, 2014
Sunday, May 4, 2014
121: Train Revisited
What about the Sequel?
Check out AWESOME "how many ways can something be arranged?" from @afs8math http://t.co/P5dBwtDHau & http://t.co/qPR7Vqw6SU cc @mr_stadel
— Fawn Nguyen (@fawnpnguyen) April 15, 2014
120: Permutations - Arranging the Train
Stop the video before he starts giving out answers.
Well?
Well?
Check out AWESOME "how many ways can something be arranged?" from @afs8math http://t.co/P5dBwtDHau & http://t.co/qPR7Vqw6SU cc @mr_stadel
— Fawn Nguyen (@fawnpnguyen) April 15, 2014
Saturday, May 3, 2014
119: Area of Triangles
From the Amazingly Amazing Fake Martin Gardner Twitter Account:
Which has the larger area?
Which has the larger area?
- A triangle with sides of 3, 4, and 5.
- A triangle with sides of 300, 400, and 700.
- Change one dimension of the 300, 400, 700 triangle to give the two triangles the same area.
"Which has the larger area? A triangle with sides of 3, 4, 5, or a triangle with sides of 300, 400, and 700?" p17 Riddles of the Sphinx
— Martin Gardner tweet (@WWMGT) April 27, 2014
118: Questions for Sale
Got this email today:
I teach high school math ... is that going to be enough?
At $99 for a school-wide license, is it worth it?
At $99 for a school-wide license, is it worth it?
Friday, May 2, 2014
117: Fibonacci divided by Twos
1/4 + 1/8 + 2/16 + 3/32 + 5/64 + 8/128 + 13/256 + 21/512 + 34/1024 + ...
1/4 + 1/8 + 2/16 + 3/32 + 5/64 + 8/128 + 13/256 + 21/512 + 34/1024 + ... = ?
— Matt Enlow (@CmonMattTHINK) April 16, 2014
Thursday, May 1, 2014
116: Dating
It's a well-known formula ... your age divided by two, and add seven. If your date is any younger than that, it's just creepy.
By this calculation, what is the youngest you are allowed to go on a date?
By this calculation, what is the youngest you are allowed to go on a date?