James Stewart

ISBN: 9781305266643

Textbook Problem

Find the velocity and position vectors of a particle that has the given acceleration and the given initial velocity and position.

15. a(t) = 2 i + 2t k, v(0) = 3i − j, r(0) = j + k

To determine

To find: The velocity and position vectors of a particle.

a(t)=2 i+2t k, v(0)=3 i−j and r(0)=j+k.

Formula used:

Write the expression to find the acceleration,

a(t)=v′(t) (1)

Write the expression to find the velocity,

v(t)=r′(t) (2)

Modify equation (1), to obtain the velocity,

Substitute 2 i+2t k for a(t).

v(t)=∫(2 i+2t k) dt=∫2 i dt+∫2t k dt=2 i(t)+2 k(t22)+C

v(t)=2t i+t2 k+C (3)

Then, v(0)=C.

Substitute 3 i−j for v(0),

Substitute 3 i−j for C in equation (3),

v(t)=2t i+t2 k+(3 i−j)=(2t+3) i−j+t2 k

Modify equation (2), to obtain the position vector

Check out a sample textbook solution.

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Find the velocity and position vectors of a particle that has the given acceleration and the given initial velocity and position. 15. a(t) = 2 i + 2t k, v(0) = 3i − j, r(0) = j + k

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Find the velocity and position vectors of a particle that has the given acceleration and the given initial velocity and position.

15. a(t) = 2 i + 2t k, v(0) = 3i − j, r(0) = j + k