2005 AMC 12B Problem 23

Below is the professionally curated solution for Problem 23 of the 2005 AMC 12B, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2005 AMC 12B solutions, or check the answer key.

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Concepts:sum and difference of cubeslogarithmsymmetry (algebra)

Difficulty rating: 2110

23.

Let SS be the set of ordered triples (x,y,z)(x, y, z) of real numbers for which log10(x+y)=zandlog10(x2+y2)=z+1. \log_{10}(x + y) = z \quad\text{and}\quad \log_{10}(x^2 + y^2) = z + 1. There are real numbers aa and bb such that for all ordered triples (x,y,z)(x, y, z) in SS we have x3+y3=a103z+b102z.x^3 + y^3 = a \cdot 10^{3z} + b \cdot 10^{2z}. What is the value of a+b?a + b?

152\dfrac{15}{2}

292\dfrac{29}{2}

1515

392\dfrac{39}{2}

2424

Solution:

The conditions give x+y=10zx + y = 10^z and x2+y2=1010z.x^2 + y^2 = 10 \cdot 10^z. Then 2xy=(x+y)2(x2+y2)=102z1010z, 2xy = (x+y)^2 - (x^2+y^2) = 10^{2z} - 10 \cdot 10^z, so xy=12(102z1010z).xy = \dfrac12\left(10^{2z} - 10 \cdot 10^z\right).

Using x3+y3=(x+y)33xy(x+y),x^3 + y^3 = (x+y)^3 - 3xy(x+y), x3+y3=103z32(102z1010z)10z=12103z+15102z. x^3 + y^3 = 10^{3z} - \dfrac32\left(10^{2z} - 10 \cdot 10^z\right)10^z = -\dfrac12 \cdot 10^{3z} + 15 \cdot 10^{2z}.

So a=12a = -\dfrac12 and b=15,b = 15, giving a+b=292.a + b = \dfrac{29}{2}.

Thus, the correct answer is B.

Problem 23 in Other Years