2005 AMC 10B Problem 24

Below is the professionally curated solution for Problem 24 of the 2005 AMC 10B, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2005 AMC 10B solutions, or check the answer key.

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Concepts:digitsdifference of squaresperfect square

Difficulty rating: 1880

24.

Let xx and yy be two-digit integers such that yy is obtained by reversing the digits of x.x. The integers xx and yy satisfy x2y2=m2x^2 - y^2 = m^2 for some positive integer m.m. What is x+y+m?x + y + m?

8888

112112

116116

144144

154154

Solution:

Write x=10a+bx = 10a + b and y=10b+ay = 10b + a with a>b.a \gt b. Then m2=x2y2=99(a2b2)=99(a+b)(ab). m^2 = x^2 - y^2 = 99(a^2 - b^2) = 99(a+b)(a-b).

Since 99=911,99 = 9 \cdot 11, for m2m^2 to be a perfect square we need 11(a+b)(ab).11 \mid (a+b)(a-b). As a+b17,a + b \le 17, this forces a+b=11,a + b = 11, and then aba - b must itself be a perfect square.

With ab8,a - b \le 8, the only workable case is ab=1,a - b = 1, giving (a,b)=(6,5).(a, b) = (6, 5). Then x=65,x = 65, y=56,y = 56, and m2=9911=332,m^2 = 99 \cdot 11 = 33^2, so m=33.m = 33.

Therefore x+y+m=65+56+33=154.x + y + m = 65 + 56 + 33 = 154.

Thus, E is the correct answer.

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