Conical Frustum
A conical frustum is a frustum created by slicing the top off a cone (with the cut made parallel to the base). For a right circular cone, let s be the slant height and R_1 and R_2 the base and top radii. Then
| s=sqrt((R_1-R_2)^2+h^2). |
(1)
|
The surface area, not including the top and bottom circles, is
The volume of the frustum is given by
| [画像: V=piint_0^h[r(z)]^2dz. ] |
(4)
|
![画像: V=piint_0^h[r(z)]^2dz.](/index.cgi/contrast/https://mathworld.wolfram.com/images/equations/ConicalFrustum/NumberedEquation2.svg){kind=link}
But
| r(z)=R_1+(R_2-R_1)z/h, |
(5)
|
so
![画像:piint_0^h[r(z)]^2dz](/index.cgi/contrast/https://mathworld.wolfram.com/images/equations/ConicalFrustum/Inline12.svg){kind=link}
![画像:piint_0^h[R_1+(R_2-R_1)z/h]^2dz](/index.cgi/contrast/https://mathworld.wolfram.com/images/equations/ConicalFrustum/Inline15.svg){kind=link}
This formula can be generalized to any pyramid by letting A_i be the base areas of the top and bottom of the frustum. Then the volume can be written as
| V=1/3h(A_1+A_2+sqrt(A_1A_2)). |
(9)
|
The area-weighted integral of z over the frustum is
![画像:piint_0^hz[r(z)]^2dz](/index.cgi/contrast/https://mathworld.wolfram.com/images/equations/ConicalFrustum/Inline23.svg){kind=link}
so the geometric centroid is located along the z-axis at a height
(Eshbach 1975, p. 453; Beyer 1987, p. 133; Harris and Stocker 1998, p. 105). The special case of the cone is given by taking R_2=0, yielding z^_=h/4.
See also
Cone, Frustum, Pyramidal Frustum, Spherical SegmentExplore with Wolfram|Alpha
More things to try:
References
Beyer, W. H. (Ed.). CRC Standard Mathematical Tables, 28th ed. Boca Raton, FL: CRC Press, pp. 129-130 and 133, 1987.Eshbach, O. W. Handbook of Engineering Fundamentals. New York: Wiley, 1975.Harris, J. W. and Stocker, H. "Frustum of a Right Circular Cone." §4.7.2 in Handbook of Mathematics and Computational Science. New York: Springer-Verlag, p. 105, 1998.Kern, W. F. and Bland, J. R. "Frustum of Right Circular Cone." §29 in Solid Mensuration with Proofs, 2nd ed. New York: Wiley, pp. 71-75, 1948.Referenced on Wolfram|Alpha
Conical FrustumCite this as:
Weisstein, Eric W. "Conical Frustum." From MathWorld--A Wolfram Resource. https://mathworld.wolfram.com/ConicalFrustum.html