2. By definition, the angle of intersection of the two curves is the angle between the two tangent vectors to the curves at the point of intersection. Find the angle of intersection of the curves ri(t) = (t, 1 – t,3+t) and r2(s) = (3 – s, s - 2, s²). %3D

2. By definition, the angle of intersection of the two curves is the angle between the two tangent vectors to the curves at the point of intersection. Find the angle of intersection of the curves ri(t) = (t, 1 – t,3+t) and r2(s) = (3 – s, s - 2, s²). %3D

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

Calculus

Please explain your work if possible. I need help with the concepts. Thank you

2.
By definition, the angle of intersection of the two curves
is the angle between the two tangent vectors to the curves at the point
of intersection.
Find the angle of intersection of the curves
ri(t) = (t, 1 – t, 3 + t?) and r2(s) = (3 – s, s – 2, s2).
%3D

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