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SECTION 5-3 Selected Topics from Number Theory Slide 5-3-1.

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Presentation on theme: "SECTION 5-3 Selected Topics from Number Theory Slide 5-3-1."— Presentation transcript:

1 SECTION 5-3 Selected Topics from Number Theory Slide 5-3-1

2 SELECTED TOPICS FROM NUMBER THEORY Perfect Numbers Deficient and Abundant Numbers Amicable (Friendly) Numbers Goldbach’s Conjecture Twin Primes Fermat’s Last Theorem Slide 5-3-2

3 PERFECT NUMBERS Slide 5-3-3 A natural number is said to be perfect if it is equal to the sum of its proper divisors. 6 is perfect because 6 = 1 + 2 + 3.

4 DEFICIENT AND ABUNDANT NUMBERS Slide 5-3-4 A natural number is deficient if it is greater than the sum of its proper divisors. It is abundant if it is less than the sum of its proper divisors.

5 EXAMPLE: CLASSIFYING A NUMBER Slide 5-3-5 Decide whether 12 is perfect, abundant, or deficient. Solution The proper divisors of 12 are 1, 2, 3, 4, and 6. Their sum is 16. Because 16 > 12, the number 12 is abundant.

6 AMICABLE (FRIENDLY) NUMBERS Slide 5-3-6 The natural numbers a and b are amicable, or friendly, if the sum of the proper divisors of a is b, and the sum of the proper divisors of b is a. The smallest pair of amicable numbers is 220 and 284.

7 GOLDBACH’S CONJECTURE (NOT PROVED) Slide 5-3-7 Every even number greater than 2 can be written as the sum of two prime numbers.

8 EXAMPLE: EXPRESSING NUMBERS AS SUMS OF PRIMES Slide 5-3-8 Write each even number as the sum of two primes. a) 12b) 40 Solution a) 12 = 5 + 7 b) 40 = 17 + 23

9 TWIN PRIMES Slide 5-3-9 Twin primes are prime numbers that differ by 2. Examples: 3 and 5, 11 and 13

10 TWIN PRIMES CONJECTURE (NOT PROVED) Slide 5-3-10 There are infinitely many pairs of twin primes.

11 SEXY PRIME Sexy primes are prime numbers that differ from each other by six. For example, 5 and 11, 7 and 13, etc. Find another sexy prime… 11, 17 17,23 23, 29 Slide 5-3-11

12 FERMAT’S LAST THEOREM Slide 5-3-12 For any natural number n 3, there are no triples (a, b, c) that satisfy the equation

13 EXAMPLE: USING A THEOREM PROVED BY FERMAT Slide 5-3-13 Every odd prime can be expressed as the difference of two squares in one and only one way. Express 7 as the difference of two squares. Solution

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