An ellipsoid has radii with lengths of $12$ , $7$ , and $7$ . A portion the size of a hemisphere with a radius of $5$ is removed form the ellipsoid. What is the remaining volume of the ellipsoid?

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Answer 1 · 2017-04-25T05:27:57

The remaining volume is $700 2/3pi$ or $2200.09$ .

The method to determine the remaining volume of the ellipsoid is to subtract the volume of the hemisphere from the original volume of the ellipsoid.

The formula for volume of an ellipsoid is:
$V_E=4/3piabc$ , where $V_E=$ Volume of ellipsoid, and $a$ , $b$ , and $c$ are the radii of the ellipsoid.

The formula for volume of a hemisphere is:
$V_H=2/3pir^3$ , where $V_H=$ Volume of hemisphere, and $r=$ radius of the hemisphere.

Hence, the remaining volume can be calculated as $V_E-V_H$ :

$V_E-V_H=4/3piabc-2/3pir^3$

$V_E-V_H=2/3pi(2abc-r^3)$

$V_E-V_H=2/3pi([2xx12xx7xx7]-[5^3])$

$V_E-V_H=2/3pi(1176-125)$

$V_E-V_H=2/3pixx1051$

$V_E-V_H=2102/3pi=700 2/3pi$

Considering $pi$ as $3.14$ :

$V_E-V_H=2102/3xx3.14$

$V_E-V_H=2200.09$

An ellipsoid has radii with lengths of 12 12 , 7 7 , and 7 7 . A portion the size of a hemisphere with a radius of 5 5 is removed form the ellipsoid. What is the remaining volume of the ellipsoid?