parametric 1 Determine the parametric equations of the path of a particle that travels the circle: (x−1)2 + (y−1)2=81 on a time interval of 0 ≤ t ≤ 2π: if the particle makes one full circle starting at the point ( 10 , 1 ) traveling counterclockwise x( t ) = y( t ) = if the particle makes one full circle starting at the point ( 1 , 10 ) traveling clockwise x( t ) = y( t ) = if the particle makes one half of a circle starting at the point ( 10 , 1 ) traveling clockwise x( t ) = y( t ) =

parametric 1 Determine the parametric equations of the path of a particle that travels the circle: (x−1)2 + (y−1)2=81 on a time interval of 0 ≤ t ≤ 2π: if the particle makes one full circle starting at the point ( 10 , 1 ) traveling counterclockwise x( t ) = y( t ) = if the particle makes one full circle starting at the point ( 1 , 10 ) traveling clockwise x( t ) = y( t ) = if the particle makes one half of a circle starting at the point ( 10 , 1 ) traveling clockwise x( t ) = y( t ) =

Elementary Linear Algebra (MindTap Course List)

8th Edition

ISBN:9781305658004

Author:Ron Larson

Publisher:Ron Larson

Chapter4: Vector Spaces

Section4.8: Applications Of Vector Spaces

Problem 82E

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Question

parametric 1

Determine the parametric equations of the path of a particle that travels the circle:

(x−1)² + (y−1)²=81

on a time interval of 0 ≤ t ≤ 2π:

if the particle makes one full circle starting at the point ( 10 , 1 ) traveling counterclockwise
x( t ) =
y( t ) =

if the particle makes one full circle starting at the point ( 1 , 10 ) traveling clockwise

x( t ) =
y( t ) =

if the particle makes one half of a circle starting at the point ( 10 , 1 ) traveling clockwise

x( t ) =
y( t ) =

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