Difference between revisions of "1958 AHSME Problems/Problem 48"
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If P is equidistant from C and D, the length is <math>2\sqrt{1^2+5^2}=2\sqrt{26}>10</math>, eliminating (A) and (C). | If P is equidistant from C and D, the length is <math>2\sqrt{1^2+5^2}=2\sqrt{26}>10</math>, eliminating (A) and (C). | ||
− | If CDP is a right triangle, then CDP will be right or DCP will be right. Assume that DCP is right. Then, APB is right, so <math>CP=\sqrt{4*6}=\sqrt{24}</math>. Then, <math>DP=\sqrt{28}</math>, so the length we are looking for is <math>\sqrt{24}+\sqrt{28}>10 | + | If CDP is a right triangle, then CDP will be right or DCP will be right. Assume that DCP is right. Then, APB is right, so <math>CP=\sqrt{4*6}=\sqrt{24}</math>. Then, <math>DP=\sqrt{28}</math>, so the length we are looking for is <math>\sqrt{24}+\sqrt{28}>10</math>, eliminating (D). |
Thus, our answer is (E). | Thus, our answer is (E). | ||
− | < | + | <math>\fbox{}</math> |
== See Also == | == See Also == |
Revision as of 23:26, 31 December 2023
Problem
Diameter of a circle with center is units. is a point units from , and on . is a point units from , and on . is any point on the circle. Then the broken-line path from to to :
Solution
- If somebody wants to draw a diagram or make this solution better, PLEASE do so. I cannot express how bad I am at this.
If P is on A, then the length is 10, eliminating answer choice (B).
If P is equidistant from C and D, the length is , eliminating (A) and (C).
If CDP is a right triangle, then CDP will be right or DCP will be right. Assume that DCP is right. Then, APB is right, so . Then, , so the length we are looking for is , eliminating (D).
Thus, our answer is (E).
See Also
1958 AHSC (Problems • Answer Key • Resources) | ||
Preceded by Problem 47 |
Followed by Problem 49 | |
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All AHSME Problems and Solutions |
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