Kindly justify your answers and be clear and detailed as much as possible with your solutions.Thanks! Consider the smooth parametric curve defined by the equations{= = t (t² − 3)= 3 (t² − 3)'where t E R.1. Show that the curve has a horizontal tangent line at the point (0, -9).d²y2. Evaluate the second derivative at the point (0, -9).dx²

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onsider the smooth parametric curve C defined by the equations Jx = t t (t²-3) Y = 3 (t² − 3)' here t € R. Show that the curve has a horizontal tangent line at the point (0, -9). d'y Evaluate the second derivative at the point (0, -9). dx²

onsider the smooth parametric curve C defined by the equations Jx = t t (t²-3) Y = 3 (t² − 3)' here t € R. Show that the curve has a horizontal tangent line at the point (0, -9). d'y Evaluate the second derivative at the point (0, -9). dx²

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

Kindly justify your answers and be clear and detailed as much as possible with your solutions. Thanks!

Consider the smooth parametric curve defined by the equations
{= = t (t² − 3)
= 3 (t² − 3)'
where t E R.
1. Show that the curve has a horizontal tangent line at the point (0, -9).
d²y
2. Evaluate the second derivative at the point (0, -9).
dx²

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