The parametric equations for the motion of a charged particle released from rest in electric and magnetic fields at right angles to each other take the forms x = a (0 – sin 0),y = a (1 – cos 0). Show that the tangent to the curve has slope cot () Use this result at a few calculated values of x and y to sketch the form of the particle's trajectory.

The parametric equations for the motion of a charged particle released from rest in electric and magnetic fields at right angles to each other take the forms x = a (0 – sin 0),y = a (1 – cos 0). Show that the tangent to the curve has slope cot () Use this result at a few calculated values of x and y to sketch the form of the particle's trajectory.

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 35E

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Question

The parametric equations for the motion of a charged particle released from rest in electric and magnetic fields at right angles to each other take
the forms x = a (0 – sin 0),y = a (1 – cos 0). Show that the tangent to the curve has slope cot () Use this result at a few calculated values of r and
y to sketch the form of the particle's trajectory.

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