(a) Explanation Given: The acceleration vector is given by a = [ d 2 r d t 2 − r ( d θ d t ) 2 ] u r + [ r d 2 θ d t 2 + 2 d r d t d θ d t ] u θ where u r = cos θ i + sin θ j and u θ = − sin θ i + cos θ j when the distance travelled by satellite in a circular motion around Earth is 42 , 000 kilometers and the angular speed ω is d θ d t = π 12 radian per hour . The distance travel by satellite in a circular motion around Earth is 42 , 000 kilometers from the center of earth. The angular speed ω is d θ d t = π 12 radian per hour . Formula used: For a vector v = a i + b j the polar form is v = r cos θ i + r sin θ j r = a 2 + b 2 Acceleration vector is: a = d 2 r d t 2 Proof: Let the position vector of the satellite is r = x i + y j . For a vector v = a i + b j . converts this equation into the polar form is v = r cos θ i + r sin θ j r = a 2 + b 2 . So, polar form is r = r cos θ i + r sin θ j . Acceleration vector is: a = d 2 r d t 2 So, first calculate d r d t , d r d t = [ d r d t cos θ − r sin θ d θ d t ] i + [ d r d t sin θ + r cos θ d θ d t ] j Now, d 2 r d t 2 = [ d 2 r d t 2 cos θ − d r d t sin θ d θ d t − d r d t sin θ d θ d t − r cos θ ( d θ (b) To determine To calculate: The radial and angular component of the acceleration for the satellite. When the distance travelled by satellite in a circular motion around Earth is 42 , 000 kilometers.

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ISBN: 9781337275378

Author: Ron Larson, Bruce H. Edwards

Publisher: Cengage Learning

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Chapter 12, Problem 8PS

(a)

To determine

To prove: The acceleration vector is given by a=[d2rdt2−r(dθdt)2]ur+[rd2θdt2+2drdtdθdt]uθ.

(b)

To determine

To calculate: The radial and angular component of the acceleration for the satellite. When the distance travelled by satellite in a circular motion around Earth is 42,000 kilometers.

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Chapter 12, Problem 7PS

Chapter 12, Problem 9PS

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Chapter 12 Solutions

Multivariable Calculus

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To prove: The acceleration vector is given by a = [ d 2 r d t 2 − r ( d θ d t ) 2 ] u r + [ r d 2 θ d t 2 + 2 d r d t d θ d t ] u θ .

Solution Summary: The author explains that the acceleration vector is given by a=left, where the distance traveled by satellite is 42,000 kilometers from the center of earth.

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To prove: The acceleration vector is given by a=[d2rdt2−r(dθdt)2]ur+[rd2θdt2+2drdtdθdt]uθ.

To calculate: The radial and angular component of the acceleration for the satellite. When the distance travelled by satellite in a circular motion around Earth is 42,000 kilometers.

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Chapter 12 Solutions