The two curves below intersect at the origin. Find the angle 0 of intersection at that point.ri(t) = (-5t, t², 3t*)r2 (t) = (1 – cos 2t, sin 3t, e2t – 1)Show your work and answer on your own paper. Leave the box below BLANK.

Answered: Image /qna-images/answer/924bcebd-5b39-4bbb-9768-395b7f8c61a9.jpg

The two curves below intersect at the origin. Find the angle 0 of intersection at that point. ri (t) = (-5t, t2 , 3t*) r2 (t) = (1 – cos 2t, sin 3t, e2t – 1) - Show your work and answer on your own paper. Leave the box below BLANK.

The two curves below intersect at the origin. Find the angle 0 of intersection at that point. ri (t) = (-5t, t2 , 3t*) r2 (t) = (1 – cos 2t, sin 3t, e2t – 1) - Show your work and answer on your own paper. Leave the box below BLANK.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter11: Topics From Analytic Geometry

Section11.4: Plane Curves And Parametric Equations

Problem 33E

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Question

The two curves below intersect at the origin. Find the angle 0 of intersection at that point.
ri(t) = (-5t, t², 3t*)
r2 (t) = (1 – cos 2t, sin 3t, e2t – 1)
Show your work and answer on your own paper. Leave the box below BLANK.

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