A circle x^{2}+y^{2}=a^{2} is rotated around the y-axis to form a solid sphere of radius a.

Brenton Dixon

Brenton Dixon

Answered question

2022-07-23

Finding volume of a sphere
I am stuck on the following problem:
A circle x 2 + y 2 = a 2 is rotated around the y-axis to form a solid sphere of radius a. A plane perpendicular to the y-axis at y = a 2 cuts off a spherical cap from the sphere. What fraction of the total volume of the sphere is contained in the cap?
So far I have figured out the following:
Rotating the cap on the y axis we get a height h starting from y = a 2 . The interval from y = 0 to y = a 2 (the region below the cap) should be:
a h
I also know that the radius of the sliced disk, x, can be derived from the equation of the circle:
x = a 2 y 2
Since the area of a circle is A = π r 2 the area with respect to y for the circle should be:
A ( y ) = π ( a 2 y 2 )
So to find the volume, we need to integrate the function:
V = a 2 a π ( a 2 y 2 ) d y
I know where I should go, but I am not sure what to do about the constraint y = a 2 at this point. Should I integrate the terms with respect to y first and then plug in the value which is equal to y? Or should this be done before integrating?

Answer & Explanation

Sandra Randall

Sandra Randall

Beginner2022-07-24Added 17 answers

Step 1
y = a / 2 is not a constraint; it's one of the integration bounds, and you've already written it into the integral as an integration bound correctly. Now all you have to do is evaluate the integral.
Step 2
By the way, your derivation of the bounds seems unnecessarily complicated. There's no reason to invoke y = 0, which doesn't play any special role here. The truncated sphere lies between -a and a/2 and the cap that's cut off lies between a/2 and a, so you integrate from a/2 to a; nothing to be subtracted or calculated there.

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