1999 AHSME Problems/Problem 22
Contents
Problem
The graphs of and intersect at points and . Find .
Solution
Each of the graphs consists of two orthogonal half-lines. In the first graph both point downwards at a angle, in the second graph they point upwards. One can easily find out that the only way how to get these graphs to intersect in two points is the one depicted below:
Obviously, the maximum of the first graph is achieved when , and its value is . Similarly, the minimum of the other graph is . Therefore the two remaining vertices of the area between the graphs are and .
As the area has four right angles, it is a rectangle. Without actually computing and we can therefore conclude that .
Explanation of the last step
This is a property all rectangles in the coordinate plane have.
For a proof, note that for any rectangle its center can be computed as and at the same time as . In our case, we can compute that the center is , therefore , and .
An alternate last step
We can easily compute and using our picture.
Consider the first graph on the interval . The graph starts at height , then rises for steps to the height , and then falls for steps to the height . Solving for we get . Similarly we compute , therefore .
See also
1999 AHSME (Problems • Answer Key • Resources) | ||
Preceded by Problem 21 |
Followed by Problem 23 | |
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