Given: \(\frac{x-1}{(x-2)^2+25}=\frac{2}{17}\)

Cross multiply to get: \((17)(x-1)=(2)[(x-2)^2+25]\)

Expand both sides: \(17x-17=(2)[(x^2-4x+4)+25]\)

Simplify: \(17x-17=(2)[x^2-4x+29]\)

Simplify again: \(17x-17=2x^2-8x+58\)

Add \(17\) to both sides: \(17x=2x^2-8x+75\)

Subtract \(17x\) from both sides: \(0=2x^2-25x+75\)

Factor: \(0 = (2x - 15)(x - 5)\)

If \(x-5=0\), then \(x=5\), in which case Quantity B is greater
If \(2x-15=0\), then \(x=7.5\), in which case Quantity B is greater

In both possible cases, Quantity B is greater

Answer: B