Difference between revisions of "2013 AIME I Problems/Problem 3"
Arcticturn (talk | contribs) (→Solution 6) |
Pi is 3.14 (talk | contribs) (→Video Solution) |
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+ | == Video Solution by OmegaLearn == | ||
+ | https://youtu.be/FWmrHV1dWPM?t=39 | ||
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+ | ~ pi_is_3.14 | ||
==Video Solution== | ==Video Solution== |
Revision as of 02:51, 23 January 2023
Contents
Problem
Let be a square, and let and be points on and respectively. The line through parallel to and the line through parallel to divide into two squares and two nonsquare rectangles. The sum of the areas of the two squares is of the area of square Find
Solution
It's important to note that is equivalent to
We define as the length of the side of larger inner square, which is also , as the length of the side of the smaller inner square which is also , and as the side length of . Since we are given that the sum of the areas of the two squares is of the the area of ABCD, we can represent that as . The sum of the two nonsquare rectangles can then be represented as .
Looking back at what we need to find, we can represent as . We have the numerator, and dividing by two gives us the denominator . Dividing gives us an answer of .
Solution 2
Let the side of the square be . Therefore the area of the square is also . We label as and as . Notice that what we need to find is equivalent to: . Since the sum of the two squares () is (as stated in the problem) the area of the whole square, it is clear that the sum of the two rectangles is . Since these two rectangles are congruent, they each have area: . Also note that the area of this is . Plugging this into our equation we get:
Solution 3
Let be , and be . Then we are looking for the value . The areas of the smaller squares add up to of the area of the large square, . Cross multiplying and simplifying we get . Rearranging, we get
Solution 4 (Vieta's)
As before, is equivalent to . Let represent the value of . Since the area of the two rectangles is . Adding to both sides and dividing by gives Note that the two possible values of in the quadratic both sum to like how and does. Therefore, must be the other root of the quadratic that isn't. Applying Vietas and manipulating the numerator, we get .
Solution 5 (Fast)
Let and . From this, we get . The problem is asking for , which can be rearranged to give . The problem tells us that . We simplify to get . Finally, we divide both sides by to get . - Spacesam
Solution 5 (A faster Vieta's)
After we get the polynomial we want to find Since the product of the roots of the polynomial is 1, the roots of the polynomial are simply Hence is just by Vieta's formula, or
Solution 6
We have the equation = . We get . We rearrange to get . Since the problem only asks us for a ratio, we assume = . We have = . Solving the quadratic yields and . It doesn't really matter which one it is, since both of them are positive. We will use .
We have . Rationalizing the denominator gives us . Our answer is
~Arcticturn
Video Solution by OmegaLearn
https://youtu.be/FWmrHV1dWPM?t=39
~ pi_is_3.14
Video Solution
https://www.youtube.com/watch?v=kz3ZX4PT-_0 ~Shreyas S
See also
2013 AIME I (Problems • Answer Key • Resources) | ||
Preceded by Problem 2 |
Followed by Problem 4 | |
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.