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Find the volume V of the solid obtained by rotating the region bounded by the given curves about the specified line. Only 1 try remaining for this problem or else I get a zero. Please help if you know the answer or how to solve.

Find the volume V of the solid obtained by rotating the region bounded by the given-example-1
User Artkoshelev
by
2.5k points

1 Answer

11 votes
11 votes

Using the shell method, the volume is


\displaystyle 2\pi \int_0^1 (2-x) \cdot 8x^3 \, dx = 16\pi \int_0^1 (2x^3 - x^4) \, dx

Each cylindrical shell has radius
2-x (the horizontal distance from the axis of revolution to the curve
y=8x^3); has height
8x^3 (the vertical distance between a point on the
x-axis in
0\le x\le1 and the curve
y=8x^3).

Compute the integral.


\displaystyle 16 \pi \int_0^1 (2x^3 - x^4) \, dx = 16\pi \left(\frac{x^4}2 - \frac{x^5}5\right) \bigg|_(x=0)^(x=1) \\\\ ~~~~~~~~~~~~~~~~~~~~~~~~~~~~ = 16\pi \left(\frac12 - \frac15\right) \\\\ ~~~~~~~~~~~~~~~~~~~~~~~~~~~~ = \frac{24}5\pi = \boxed{4.8\pi}

Find the volume V of the solid obtained by rotating the region bounded by the given-example-1
User Roger Urscheler
by
3.1k points