Difference between revisions of "2007 USAMO Problems/Problem 5"
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We proceed by induction. | We proceed by induction. | ||
− | Let <math> | + | Let <math>{a_{n}}</math> be <math>7^{7^{n}}+1</math>. The result holds for <math>{n=0}</math> because <math>{a_0 = 2^3}</math> is the product of <math>3</math> primes. |
− | Now we assume the result holds for <math> | + | Now we assume the result holds for <math>{n}</math>. Note that <math>{a_{n}}</math> satisfies the [[recursion]] |
− | <div style="text-align:center;"><math> | + | <div style="text-align:center;"><math>{a_{n+1}= (a_{n}-1)^{7}+1} = a_{n}\left(a_{n}^{6}-7(a_{n}-1)(a_{n}^{2}-a_{n}+1)^{2}\right)</math>.</div> |
− | Since <math> | + | Since <math>{a_n - 1}</math> is an odd power of <math>{7}</math>, <math>{7(a_n-1)}</math> is a perfect square. Therefore <math>{a_{n}^{6}-7(a_{n}-1)(a_{n}^{2}-a_{n}+1)^{2}}</math> is a difference of squares and thus [[composite]], i.e. it is divisible by <math>{2}</math> primes. By assumption, <math>{a_n}</math> is divisible by <math>{2n + 3}</math> primes. Thus <math>{a_{n+1}}</math> is divisible by <math>{2+ (2n + 3) = 2(n+1) + 3}</math> primes as desired. |
=== Solution 2 === | === Solution 2 === |
Revision as of 19:25, 15 October 2007
Problem
Prove that for every nonnegative integer , the number is the product of at least (not necessarily distinct) primes.
Solution
Solution 1
We proceed by induction.
Let be . The result holds for because is the product of primes.
Now we assume the result holds for . Note that satisfies the recursion
Since is an odd power of , is a perfect square. Therefore is a difference of squares and thus composite, i.e. it is divisible by primes. By assumption, is divisible by primes. Thus is divisible by primes as desired.
Solution 2
Notice that . Therefore it suffices to show that is composite.
Let . The expression becomes
which is the shortened form of the geometric series . This can be factored as
Since is an odd power of , is a perfect square, and so we can factor this by difference of squares. Therefore, it is composite.
See also
2007 USAMO (Problems • Resources) | ||
Preceded by Problem 4 |
Followed by Problem 6 | |
1 • 2 • 3 • 4 • 5 • 6 | ||
All USAMO Problems and Solutions |