Consider the following.₂ (t) = (30, ², ³), ₂(t) = (sin(t), sin(St), 4t)Find r(t) and r2(t).r' (t) =✓'₂ (t)=The curves r₂(t) = (3t, t², ³) and r₂(t) = (sin(t), sin(St), 4t) intersect at the origin. Find their angle of intersection, 8, correct to the nearest degree.=

Answered: Image /qna-images/answer/e4a7d026-2e91-4508-9058-70f96033a56a.jpg

Consider the following. ₂ (t) = (30, ², ³), ₂(t) = (sin(t), sin(St), 4t) Find r(t) and r2(t). r'₂ (²) = The curves r(t) = (3t, +², +³) and r₂(t) = (sin(t), sin(5t), 4t) intersect at the origin. Find their angle of intersection, 8, correct to the nearest degree.

Consider the following. ₂ (t) = (30, ², ³), ₂(t) = (sin(t), sin(St), 4t) Find r(t) and r2(t). r'₂ (²) = The curves r(t) = (3t, +², +³) and r₂(t) = (sin(t), sin(5t), 4t) intersect at the origin. Find their angle of intersection, 8, correct to the nearest degree.

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

Consider the following.
₂ (t) = (30, ², ³), ₂(t) = (sin(t), sin(St), 4t)
Find r(t) and r2(t).
r' (t) =
✓'₂ (t)=
The curves r₂(t) = (3t, t², ³) and r₂(t) = (sin(t), sin(St), 4t) intersect at the origin. Find their angle of intersection, 8, correct to the nearest degree.
=

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