See the problem as well as its respective options in the attached image 3. Below is a curve C, which is the intersection between the surfacesSi: z = 4-x? and S2: z + 2x -2y = 4.CA possible form for the parameterization n of the curve C corresponds to:= (x(t), V4 – t - 2 +t), with 0 sts 4B)r(t) = (t, 2t –z(t)), with 0 sts 4C)r(t) = (x(t), V4 – t² + 2 – t,t), with 0 st s 2D) r(t) = (t, -t +,z(t), with 0sts2

3. Below is a curve C, which is the intersection between the surfaces S1: z = 4 -x? and S2: z + 2x -2y = 4. C A possible form for the parameterization n of the curve C corresponds to: A) r(t) = (x(t), V4 –t- 2+.t),with 0

3. Below is a curve C, which is the intersection between the surfaces S1: z = 4 -x? and S2: z + 2x -2y = 4. C A possible form for the parameterization n of the curve C corresponds to: A) r(t) = (x(t), V4 –t- 2+.t),with 0

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 34E

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Question

See the problem as well as its respective options in the attached image

3. Below is a curve C, which is the intersection between the surfaces
Si: z = 4-x? and S2: z + 2x -2y = 4.
C
A possible form for the parameterization n of the curve C corresponds to:
= (x(t), V4 – t - 2 +t), with 0 sts 4
B)r(t) = (t, 2t –z(t)), with 0 sts 4
C)r(t) = (x(t), V4 – t² + 2 – t,t), with 0 st s 2
D) r(t) = (t, -t +,z(t), with 0sts2

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