In geometry, a spherical shell (a ball shell) is a generalization of an annulus to three dimensions. It is the region of a ball between two concentric spheres of differing radii.
Volume
The volume of a spherical shell is the difference between the enclosed volume of the outer sphere and the enclosed volume of the inner sphere:
V = 4 3 π R 3 − 4 3 π r 3 = 4 3 π ( R 3 − r 3 ) = 4 3 π ( R − r ) ( R 2 + R r + r 2 ) {\displaystyle {\begin{aligned}V&={\tfrac {4}{3}}\pi R^{3}-{\tfrac {4}{3}}\pi r^{3}\\[3mu]&={\tfrac {4}{3}}\pi {\bigl (}R^{3}-r^{3}{\bigr )}\\[3mu]&={\tfrac {4}{3}}\pi (R-r){\bigl (}R^{2}+Rr+r^{2}{\bigr )}\end{aligned}}}where r is the radius of the inner sphere and R is the radius of the outer sphere.
Approximation
An approximation for the volume of a thin spherical shell is the surface area of the inner sphere multiplied by the thickness t of the shell:2
V ≈ 4 π r 2 t , {\displaystyle V\approx 4\pi r^{2}t,}when t is very small compared to r ( t ≪ r {\displaystyle t\ll r} ).
The total surface area of the spherical shell is 4 π r 2 {\displaystyle 4\pi r^{2}} .
See also
References
Weisstein, Eric W. "Spherical Shell". mathworld.wolfram.com. Wolfram Research, Inc. Archived from the original on 2 August 2016. Retrieved 7 January 2017. http://mathworld.wolfram.com/SphericalShell.html ↩
Znamenski, Andrey Varlamov; Lev Aslamazov (2012). A.A. Abrikosov Jr. (ed.). The wonders of physics. Translated by A.A. Abrikosov Jr.; J. Vydryg; D. Znamenski (3rd ed.). Singapore: World Scientific. p. 78. ISBN 978-981-4374-15-6. 978-981-4374-15-6 ↩