Difference between revisions of "2014 AIME II Problems/Problem 7"
(→See also) |
|||
Line 11: | Line 11: | ||
Now we write out the notation and simplify: | Now we write out the notation and simplify: | ||
− | <math>\log_{10}{f(1)}+\log_{10}{f(2)}+...+\ | + | <math>\log_{10}{f(1)}+\log_{10}{f(2)}+...+\log_{10}{f(n)}=\log_{10}{f(1)\cdot f(2) \cdot ... \cdot f(n)}=1,-1</math> |
Converting to exponential form we have the much nicer equation: | Converting to exponential form we have the much nicer equation: |
Revision as of 12:37, 2 July 2014
Contents
Problem
Let . Find the sum of all positive integers for which
Solution 1
First, let's simplify that big ugly sigma notation:
Now we write out the notation and simplify:
Converting to exponential form we have the much nicer equation:
OKAY. Now let's look at the function f. Well we have the base which factors nicely into . And then there's the exponent. Hmm well there's a pi inside. That must count for something. Well, if x is odd, then the exponent will be -1 because the cosine of an odd multiple of pi is always -1. However, if it's an even multiple of pi, the cosine is 1. Remember raising to an exponent of -1 just gives the reciprocal. So we have fractions and then anti-fractions and we're multiplying them? Let's plug in the values without simplifying:
Aha! MASS CANCELATION...however, notice we can't really end because we don't know if the value of n is going to be odd or even. We can prove this mass cancelation happens by simply looking at consecutive functions of f:
Therefore this does indeed cancel and was not a clever trap set by AIME committee. However, we still don't know where to end. So we branch off into 2 cases here:
Case 1: n is odd
Okk so if n is odd, then the exponent of f(n) is -1 and we have
Now we simply solve for n in both situations and see which one gives us an integer n:
Case 2 : n is even
Okk so if n is even, then the exponent of f(n) is 1 and we have:
Now we simply solve for n in both situations and see which one gives us an integer n:
OKKK FINALLY BACK TO THE SOLUTION:
We've got n=18,3. So the sum is clearly
Solution 2
Note that is when is odd and when is even. Also note that for all . Therefore Because of this, is a telescoping series of logs, and we have Setting each of the above quantities to and and solving for , we get possible values of and so our desired answer is
See also
2014 AIME II (Problems • Answer Key • Resources) | ||
Preceded by Problem 6 |
Followed by Problem 8 | |
1 • 2 • 3 • 4 • 5 • 6 • 7 • 8 • 9 • 10 • 11 • 12 • 13 • 14 • 15 | ||
All AIME Problems and Solutions |
The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions.