2010 AMC 12A Problems/Problem 21
Contents
Problem
The graph of lies above the line except at three values of , where the graph and the line intersect. What is the largest of these values?
Solution 1
The values in which intersect at are the same as the zeros of .
Since there are zeros and the function is never negative, all zeros must be double roots because the function's degree is .
Suppose we let , , and be the roots of this function, and let be the cubic polynomial with roots , , and .
In order to find we must first expand out the terms of .
[Quick note: Since we don't know , , and , we really don't even need the last 3 terms of the expansion.]
All that's left is to find the largest root of .
Solution 2
The values in which intersect at are the same as the zeros of . We also know that this graph has 3 places tangent to the x-axis, which means that each root has to have a multiplicity of 2. Let the function be .
Applying Vieta's formulas, we get or . Applying it again, we get, after simplification, .
Notice that squaring the first equation yields , which is similar to the second equation.
Subtracting this from the second equation, we get . Now that we have to term, we can manpulate the equations to yield the sum of squares. or . We finally reach .
Since the answer choices are integers, we can guess and check squares to get in some order. We can check that this works by adding then and seeing . We just need to take the lowest value in the set, square root it, and subtract the resulting value from 5 to get .
Note: One could also subtract from to obtain . The ordered triple {16,4,1} sums to 21, and the answer choices are all positive integers, therefore the answer is the 4.
Alternative method:
After reaching and , we can algebraically derive .
Applying Vieta's formulas on the term yields .
Notice that , so
Subtracting this from yields , so , which means that , , and are the roots of the cubic , and it is not hard to find that these roots are , , and . The largest of these values is .
See also
2010 AMC 12A (Problems • Answer Key • Resources) | |
Preceded by Problem 20 |
Followed by Problem 22 |
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All AMC 12 Problems and Solutions |
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