Let V Be the Volume of the Solid That Lies $y = x ^ { 2 }$

Let V be the volume of the solid that lies between planes perpendicular to the x-axis from x = 0 to x = 3. The cross-sections of this solid perpendicular to the x-axis run from $y = x ^ { 2 }$ to $y = 3 \sqrt { 3 x }$ and they are semicircles with diameters in the xy-plane. Then V is

A) $\frac { 2187 \pi } { 560 }$
B) $\frac { 25 \pi } { 3 }$
C) $\frac { 7 \pi } { 3 }$
D) $\frac { 9 \pi } { 35 }$
E) $\frac { 4 \pi } { 5 }$

Correct Answer:

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