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GR0568 #16

Posted: Fri Mar 26, 2010 8:00 am
by thmsrhn
Please help me solve the following problem.

"Whatr is the volume of the solid formed by revolving about the x axis the region in the first quadrant of the xy plane bounded by co ordinate axes and the graph of the equation y=(1+x^2)^(-.5)?

Re: GR0568 #16

Posted: Fri Mar 26, 2010 8:49 am
by origin415
For volumes of solids of revolution, you want to create a new function corresponding to the cross-sectional area of the object, and integrate over that. Your function $$f(x)$$ corresponds to the radius, so your integral will be

$$\pi \int (f(x))^2 dx$$

Re: GR0568 #16

Posted: Fri Mar 26, 2010 12:00 pm
by mathQ
Volume = Int pi * y^2 dx | (inf, -inf)


with that ans should be pi^2

Re: GR0568 #16

Posted: Fri Mar 26, 2010 2:27 pm
by thmsrhn
I know rite?!, but that ain t the answer. it ((pi)^2)/2!!

Re: GR0568 #16

Posted: Fri Mar 26, 2010 5:29 pm
by joey
Only the part in the first quadrant is revolved. Use
$$A=\pi \int_0^\infty \left[f(x)\right] ^2dx.$$

Re: GR0568 #16

Posted: Sun Mar 28, 2010 1:21 am
by mathQ
Thanks joey.

the limit should be 0, Inf

with that ans is pi^2/2