How do you find the average and instantaneous rate of change of #y=-1/(x-3)# over the interval [0,1/2]?

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Answer 1 · 2018-07-09T12:59:47

Average rate change over the interval #[0,1/2]# is #2/15#
Instantaneous rate of change at point #x# is #1/(x-3)^2 #

#y=f(x)= -1/(x-3)= -(x-3)^-1#

Average rate of change over the interval #[0,1/2]# is

#R_a= (f(b)- f(a))/(b-a) ;a= 0 , b= 1/2#

#f(1/2)= -1/(1/2-3)= 2/5 ; f(0)= -1/(0-3)= 1/3#

#:. R_a= (2/5-1/3)/(1/2-0)=1/15/1/2=2/15#

Average rate change over the interval #[0,1/2]# is #2/15#

Instantaneous rate of change is derivative of #f(x)# at the

point #x :. f^'(x)=-.-(x-3)^-2= 1/(x-3)^2 #

Instantaneous rate of change at point #x# is #1/(x-3)^2 # [Ans]