2023 AMC 10A Problems/Problem 17
Problem
Let be a rectangle with and . Point and lie on and respectively so that all sides of and have integer lengths. What is the perimeter of ?
Solution 1
We know that all side lengths are integers, so we can test Pythagorean triples for all triangles.
First, we focus on . The length of is , and the possible Pythagorean triples can be are where the value of one leg is a factor of . Testing these cases, we get that only is a valid solution because the other triangles result in another leg that is greater than , the length of . Thus, we know that and .
Next, we move on to . The length of is , and the possible triples are and . Testing cases again, we get that is our triple. We get the value of , and .
We know that which is , and which is . is therefore a right triangle with side length ratios , and the hypotenuse is equal to . has side lengths and so the perimeter is equal to
~Gabe Horn ~ItsMeNoobieboy
Solution 2
Let BP=y and AP=z. We get 30^2+y^2=z^2. Subtracting y^2 on both sides, we get 30^2=z^2-y^2. Factoring, we get 30^2=(z-y)(z+y). Since y and z are integers, both z-y and z+y have to be even or both have to be odd. We also have y<31. We can pretty easily see now that z-y=18 and z+y=50. Thus, y=16 and z=34. We now get CP=12. We do the same trick again. Let DQ=a and AQ=b. Thus, 28^2=(b+a)(b-a). We can get b+a=56 and b-a=14. Thus, b=35 and a=21. We get CQ=9 and by the Pythagorean Theorem, we have PQ=15. We get AP+PQ+AQ=34+15+35=84. Our answer is A.
If you want to see a video solution on this solution, look at Video Solution 1.
-paixiao
Video Solution 1
https://www.youtube.com/watch?v=eO_axHSmum4
-paixiao
See Also
2023 AMC 10A (Problems • Answer Key • Resources) | ||
Preceded by Problem 16 |
Followed by Problem 18 | |
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All AMC 10 Problems and Solutions |
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