Deceleration of a point when it is momentarily at rest moving along a straight line with velocity 16-t^2?

1 Answer
Feb 13, 2018

acceleration #= -8 #

Explanation:

the point at which it is at rest is the point when its velocity is 0 so we can find that as #16 - t^2 = 0 # to find that #t = 4# when it is at rest (Note that time only moves forward and starts from 0 so #t = -4# is not an option)

the derivative of velocity is acceleration, therefore #v'(t) = a(t) = d/dx (16 - t^2) = -2t#

therefore at point #t = 4,#
#v'(4) = a(4) = -2 * 4 = -8#

therefore , acceleration #= -8#