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- The volume of sphere using integrals - Mathematics Stack Exchange
The volume of sphere using integrals Ask Question Asked 8 years, 3 months ago Modified 1 year, 8 months ago
- Why is the volume of a sphere $\frac {4} {3}\pi r^3$?
Now if I have a sphere of radius r, and I increase the radius by a tiny amount, dr, then the new, expanded sphere has a volume that is bigger, by the volume of the thin spherical shell that was just added
- Proofs of the Volume of a Sphere. - Mathematics Stack Exchange
I was asked to explain why the volume of a sphere is $\\frac{4}{3}\\pi r^3$ to a student that does not have the knowledge of calculus In doing so I thought of an argument and I cannot seem to find t
- Rate of Change of Volume in a Sphere - Mathematics Stack Exchange
Rate of Change of Volume in a Sphere Ask Question Asked 9 years, 11 months ago Modified 6 years, 6 months ago
- differential geometry - Volume form on $ (n-1)$-sphere $S^ {n-1 . . .
How proof that $\omega$ is the volume form? The first thing that comes to mind is show that $\int_ {S^ {n-1}}\omega=Vol (S^ {n-1})$ but I have serious problems with the definition, I think that is to much
- integration - Volume of a sphere using cartesian coordinates . . .
A sphere is a 3-dimensional object The 2-dimensional analogue of a sphere is a circle
- Proof of Volume of sphere - Mathematics Stack Exchange
I want a simple proof for the formula of volume of sphere Does the proof explanation without integration possible?
- Volume of a Sphere with Cylinder in the Middle
If this is the volume of the sphere, I am not sure how I am supposed to show this using the shell method Any assistance would help! A picture below depicts the problem
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