Zone

The surface area of a spherical segment. Call the radius of the sphere R, the upper and lower radii b and a, respectively, and the height of the spherical segment h. The zone is a surface of revolution about the z-axis, so the surface area is given by

[画像: S=2piintxsqrt(1+x^('2))dz. ]

(1)

In the xz-plane, the equation of the zone is simply that of a circle,

x=sqrt(R^2-z^2),

(2)

x^' = -z(R^2-z^2)^(-1/2)

(3)

x^('2) = [画像:(z^2)/(R^2-z^2),]

(4)

and

S = [画像:2piint_(sqrt(R^2-a^2))^(sqrt(R^2-b^2))sqrt(R^2-z^2)sqrt(1+(z^2)/(R^2-z^2))dz]

(5)

= [画像:2piRint_(sqrt(R^2-a^2))^(sqrt(R^2-b^2))dz]

(6)

= 2piR(sqrt(R^2-b^2)-sqrt(R^2-a^2))

(7)

= 2piRh.

(8)

This result is somewhat surprising since it depends only on the height of the zone, not its vertical position with respect to the sphere.

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References

Beyer, W. H. (Ed.). CRC Standard Mathematical Tables, 28th ed. Boca Raton, FL: CRC Press, p. 130, 1987.Kern, W. F. and Bland, J. R. "Zone." §35 in Solid Mensuration with Proofs, 2nd ed. New York: Wiley, pp. 95-97, 1948.

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Zone

Cite this as:

Weisstein, Eric W. "Zone." From MathWorld--A Wolfram Resource. https://mathworld.wolfram.com/Zone.html

Zone

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