A smooth curve C is defined by some vector function R(t) with R() = (7,0,-2) and R' (t) = (2, √5 csct, 2 cott) for all t € (0, π). 1. Give a vector equation of the line tangent to C at the point where t 2. Find the moving trihedral of C for all t € (0, π). अ 2

A smooth curve C is defined by some vector function R(t) with R() = (7,0,-2) and R' (t) = (2, √5 csct, 2 cott) for all t € (0, π). 1. Give a vector equation of the line tangent to C at the point where t 2. Find the moving trihedral of C for all t € (0, π). अ 2

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter11: Topics From Analytic Geometry

Section: Chapter Questions

Problem 18T

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Question

A smooth curve C is defined by some vector function R(t) with
R() = (7,0,-2) and R'(t) = (2, √5 csct, 2 cott) for all t € (0, π).
अ.
2
1. Give a vector equation of the line tangent to C at the point where t
2. Find the moving trihedral of C for all t € (0,7).
3. Reparametrize the unit tangent vector T(t) using the arc length as parameter starting from t = 1.

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