A torus is essentially a tube wrapped into a circle (a "doughnut" shape). The volume (V) of a torus can be calculated by V= 2x?Rr? volume of 2,560 cubic inches [in°] with a where R is the radius of the torus (from the center of the "tube" to the center of the hole in the middle) and r is the radius of the tube itself. If a torus has torus radius (R) of 0.29 meters [m), what is the radius of the tube (r) in units of centimeters [cm]? The radius of the tube is cm. (Round your answer to one decimal place.)

A torus is essentially a tube wrapped into a circle (a "doughnut" shape). The volume (V) of a torus can be calculated by V= 2x?Rr? volume of 2,560 cubic inches [in°] with a where R is the radius of the torus (from the center of the "tube" to the center of the hole in the middle) and r is the radius of the tube itself. If a torus has torus radius (R) of 0.29 meters [m), what is the radius of the tube (r) in units of centimeters [cm]? The radius of the tube is cm. (Round your answer to one decimal place.)

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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A torus is essentially a tube wrapped into a circle (a "doughnut" shape). The volume (V) of a torus can be calculated by
V= 2n²Rr?
where R is the radius of the torus (from the center of the "tube" to the center of the hole in the middle) and r is the radius of the tube itself. If a torus has a volume of 2,560 cubic inches [in°] with a
torus radius (R) of 0.29 meters [m], what is the radius of the tube (r) in units of centimeters [cm]?
The radius of the tube is
cm. (Round your answer to one decimal place.)

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