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GMAT Practice Question (One of Hundreds)

If (243^{9 + 18z})(81^-18z)(27^{15 - 9z}) = 1, what is the value of z?

A)	-27
B)	-10
C)	0
D)	10
E)	27

Correct Answer: D

How can the number 1 be written to have a base of 3 and an exponent?

Rewrite the terms on the left-side with common prime bases.
(243^{9 + 18z})(81^-18z)(27^{15 – 9z})
= (3^{5(9 + 18z)})(3^4(-18z))(3^{3(15 – 9z)})
= (3^{45 + 90z})(3^-72z)(3^{(45 – 27z)})
Simplify by combining terms with like bases.
(3^{45 + 90z})(3^-72z)(3^{(45 – 27z)})
= 3^{45 + 45 + 90z – 72z – 27z}
= 3^{90 -9z}
As a result of this simplification, the equation is much easier to deal with.
3^{90 -9z} = 1
At this point, the problem may appear unsolvable as different bases and exponents exist. However, remember that any number raised to the 0th power is 1. Consequently, 1 can be rewritten as 3⁰. The equation now reads:
3^{90 -9z} = 1
3^{90 -9z} = 1 = 3⁰
Since the bases are the same, you can set the exponents equal to each other. The equation becomes:
90 – 9z = 0
90 = 9z
z = 10

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