Given that \(5^x - 5^{x-1}= 500\) and we need to find the value of (x - 1)^2

\(5^x - 5^{x-1}\) = 500
=> \(5^{x-1 + 1} - 5^{x-1}\) = 500
=> \(5^{x-1} * 5^1 - 5^{x-1}\) = 500
=> \(5^{x-1} * (5 - 1)\) = 500
=> \(5^{x-1} = \frac{500}{4}\) = 125 = \(5^3\)
=> x - 1 = 3
=> x = 4

=> \((x - 1)^2\) = \((4 - 1)^2\) = 9

So, Answer will be C
Hope it helps!

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