The parametric equation of the motion of a particle on a plane is given by 3/2. x = te + 2t12; y=t' sin 3t + 2t , where t is the time in seconds. Determine the magnitude of the velocity and the angle (in degrees) which the direction of the velocity subtends with the x-axis at t = 4 seconds. %3D

The parametric equation of the motion of a particle on a plane is given by 3/2. x = te + 2t12; y=t' sin 3t + 2t , where t is the time in seconds. Determine the magnitude of the velocity and the angle (in degrees) which the direction of the velocity subtends with the x-axis at t = 4 seconds. %3D

Trigonometry (MindTap Course List)

10th Edition

ISBN:9781337278461

Author:Ron Larson

Publisher:Ron Larson

Chapter2: Analytic Trigonometry

Section2.3: Solving Trigonometric Equations

Problem 11ECP

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Question

The parametric equation of the motion of a particle on a plane is given by
x = te + 2t2; y=t² sin 3t + 2t , where t is the time in seconds.
Determine the magnitude of the velocity and the angle (in degrees) which the
direction of the velocity subtends with the x-axis at t=4 seconds.
%3D

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