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The region in the first quadrant enclosed by the system of equations is rotated about the x-axis. the volume of the solid generated is: y=0, x=5, and y= 1/(sqrt(1+x))

The region in the first quadrant enclosed by the system of equations is rotated about the x-axis. the volume of the solid generated is: y=0, x=5, and y= 1/(sqrt(1+x))
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the region in the first quadrant enclosed by the system of equations is rotated about the x-axis. the volume of the solid generated is: y=0, x=5, and y= 1/(sqrt(1+x))

User Rdonatoiop
by
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1 Answer

4 votes
With the disk method, the volume is given by the integral


\displaystyle\pi\int_(x=0)^(x=5)\left(\frac1{√(1+x)}\right)^2\,\mathrm dx=\pi\int_0^5(\mathrm dx)/(1+x)

=\displaystyle\pi\int_(t=1)^(t=6)\frac{\mathrm dt}t

where the substitution
t=x+1 was made, giving
\mathrm dt=\mathrm dx.


=\displaystyle\pi\ln|t|\bigg|_(t=1)^(t=6)

=\pi(\ln6-\ln1)

=\pi\ln6
User Aero Engy
by
8.3k points
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