1. Let R be a vector function such that T(t): = =(cos 2t,sin 2t) and R(0) = (1,0.-1). Find i. The moving trihedral to the graph of R at t = 0. ii. An equation of the osculating, rectifying, and normal planes to the graph of R at t = 0.

1. Let R be a vector function such that T(t): = =(cos 2t,sin 2t) and R(0) = (1,0.-1). Find i. The moving trihedral to the graph of R at t = 0. ii. An equation of the osculating, rectifying, and normal planes to the graph of R at t = 0.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter11: Topics From Analytic Geometry

Section: Chapter Questions

Problem 20T

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Question

1. Let R be a vector function such that (t) = (cos 2t,sin 2t) and (0) = (1,0. –1).
Find
i. The moving trihedral to the graph of R at t = 0.
ii. An equation of the osculating, rectifying, and normal planes to the graph of R at t = 0.

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