Mathematics and the Simpsons. Mathematics and the Simpsons 1/13

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1 Mathematics and the Simpsons Mathematics and the Simpsons 1/13

2 This semester we ve occasionally used the Simpsons to introduce ideas and to help explain them. That show has lots of math and science references due, in part, to many of the writers having serious scientific backgrounds. Mathematics and the Simpsons 2/13

3 This semester we ve occasionally used the Simpsons to introduce ideas and to help explain them. That show has lots of math and science references due, in part, to many of the writers having serious scientific backgrounds. We ll finish the semester with a segment from Treehouse of Horror VI. In the segment Homer gets trapped in the third dimension. While he is there several equations and formulas float around in the background. Mathematics and the Simpsons 2/13

4 This semester we ve occasionally used the Simpsons to introduce ideas and to help explain them. That show has lots of math and science references due, in part, to many of the writers having serious scientific backgrounds. We ll finish the semester with a segment from Treehouse of Horror VI. In the segment Homer gets trapped in the third dimension. While he is there several equations and formulas float around in the background. According to Wikipedia, the segment was inspired by the Twilight Zone episode Little Girl Lost. You can see the episode on YouTube. Mathematics and the Simpsons 2/13

5 Clicker Question Have you ever seen a Treehouse of Horror episode? A Yes B No Mathematics and the Simpsons 3/13

6 Euler s Formula One formula is e πi = 1 relating the numbers e and π together with the imaginary number i. This formula was discovered by Euler in the 18th century. Mathematics and the Simpsons 4/13

7 P versus NP Another formula is P = NP, referring to one of the major unsolved problems of Computer Science. For more about this problem check out en.wikipedia.org/wiki/p versus NP problem. Mathematics and the Simpsons 5/13

Ascii Code These two-digit strings represent hexadecimal numbers (base 16). Each character, letter, number, and punctuation, has an ascii code and a hexadecimal equivalent.

8 Ascii Code These two-digit strings represent hexadecimal numbers (base 16). Each character, letter, number, and punctuation, has an ascii code and a hexadecimal equivalent. This string translates into the message Frink rules! See for the conversion between hexadecimal numbers and ascii code. Mathematics and the Simpsons 6/13

Critical Density The equation in the screenshot says that the density of matter is greater than the critical density, indicating that the universe will stop

9 Critical Density The equation in the screenshot says that the density of matter is greater than the critical density, indicating that the universe will stop expanding and will eventually collapse upon itself. For more on this see hypertextbook.com/facts/2000/christinacheng.shtml. Mathematics and the Simpsons 7/13

Fermat s Last Theorem The equation 178212 + 184112 = 192212 shows

10 Fermat s Last Theorem The equation = shows up a fair amount during the segment. Mathematics and the Simpsons 8/13

11 The Pythagorean theorem says that if a, b are the lengths of the shorter sides of a right triangle and if c is the hypotenuse, then c 2 = a 2 + b 2 Mathematics and the Simpsons 9/13

12 Fermat, whom we introduced when we discussed probability, said that the equation c n = a n + b n has no whole number solutions when n is a whole number at least 3. He said he found a marvelous proof, but the margin of his book in which he wrote the claim was too small to contain it. The intrigue this caused led this to be one of the most famous open problems in mathematics. Mathematics and the Simpsons 10/13

13 Fermat, whom we introduced when we discussed probability, said that the equation c n = a n + b n has no whole number solutions when n is a whole number at least 3. He said he found a marvelous proof, but the margin of his book in which he wrote the claim was too small to contain it. The intrigue this caused led this to be one of the most famous open problems in mathematics. Many people worked on the problem. Fermat himself wrote a proof for the case n = 4, and Euler came up with a proof for n = 3. However, it wasn t until 1993 that a proof for the full result was found. This was done by Andrew Wiles. Mathematics and the Simpsons 10/13

14 The equation = is then false according to Fermat s last theorem. If you try to verify this on a calculator showing no more than 8-10 digits, you won t be able to tell that it is false. Mathematics and the Simpsons 11/13

15 However, knowing about odd and even numbers, and that raising an even number (resp. an odd number) to a power results in an even number (resp. an odd number) is enough to see this equation is false. Mathematics and the Simpsons 12/13

16 However, knowing about odd and even numbers, and that raising an even number (resp. an odd number) to a power results in an even number (resp. an odd number) is enough to see this equation is false. For, in the equation = the right-hand side is even. The left-hand side is even plus odd, which is odd. Therefore, the equation cannot be true. Mathematics and the Simpsons 12/13

17 However, knowing about odd and even numbers, and that raising an even number (resp. an odd number) to a power results in an even number (resp. an odd number) is enough to see this equation is false. For, in the equation = the right-hand side is even. The left-hand side is even plus odd, which is odd. Therefore, the equation cannot be true. The writers picked these numbers so that the left-hand side is only % larger than the right. Mathematics and the Simpsons 12/13

18 I ll be here on Wednesday at 10:30, the start of the final exam period for this time slot, to return uncollected papers. There will be no class, so you are not required to come. However, if you want to pick up papers or if you have any questions, feel free to come by then. Mathematics and the Simpsons 13/13

19 I ll be here on Wednesday at 10:30, the start of the final exam period for this time slot, to return uncollected papers. There will be no class, so you are not required to come. However, if you want to pick up papers or if you have any questions, feel free to come by then. I will try to have final grades made by then; however, this depends on how long it takes me to read and grade the projects. Mathematics and the Simpsons 13/13

I ll be here on Wednesday at 10:30, the start of the final exam period for this time slot, to return uncollected papers. There will be no class, so you are not required to come.

20 I ll be here on Wednesday at 10:30, the start of the final exam period for this time slot, to return uncollected papers. There will be no class, so you are not required to come. However, if you want to pick up papers or if you have any questions, feel free to come by then. I will try to have final grades made by then; however, this depends on how long it takes me to read and grade the projects. Mathematics and the Simpsons 13/13

5.2. Perfect Numbers Divisors of a natural number were covered in Section 5.1.

5.2. Perfect Numbers Divisors of a natural number were covered in Section 5.1. 5.2 Smith Numbers The mathematician Albert Wilansky, when phoning his brother-in-law, Mr. Smith, noticed an interesting property concerning Smith s phone number (493-7775). The number 4,937,775 is composite,