* r(t) = (-5t + 3,3 sin(4t), 3 cos(4t)) 9. a. Compute T, N, B and K for t = 5π/12 → The torsion of a space curve at a point is defined as b. Compute the torsion of r (r'xr').r"" ||r'x r'||² T ==
* r(t) = (-5t + 3,3 sin(4t), 3 cos(4t)) 9. a. Compute T, N, B and K for t = 5π/12 → The torsion of a space curve at a point is defined as b. Compute the torsion of r (r'xr').r"" ||r'x r'||² T ==
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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Question
For 9 solve for a and b
Transcribed Image Text:e. Tangential acceleration component at
*r(t) = (-5t + 3,3 sin(4t), 3 cos(4t))
9. a. Compute T, N, B and K for t =
5π/12
f. Normal acceleration
→ The torsion of a space curve at a point is defined as T =
b. Compute the torsion of r
(r'xr").r""
||r'xr"||2
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