What is the instantaneous rate of change of #f(x)=e^(5x-7) # at #x=0#? Calculus Derivatives Instantaneous Rate of Change at a Point 1 Answer A. S. Adikesavan Apr 18, 2016 #5e^(-7)# = 0.00456, nearly. Explanation: #f' = 5 e^(3x-7)#, using #d/dx(e^u)=d/(du)(e^u)d/dx(u)# At x = 0, f' = 5#e^(-7)# Answer link Related questions How do you find the instantaneous rate of change of a function at a point? What is Instantaneous Rate of Change at a Point? How do you estimate instantaneous rate of change at a point? How do you find the instantaneous rate of change of #f (x)= x ^2 +2 x ^4# at #x=1#? How do you find the instantaneous rate of change of #f(t)=(2t^3-3t+4)# when #t=2#? How do you find the instantaneous rate of change of #w# with respect to #z# for #w=1/z+z/2#? Can instantaneous rate of change be zero? Can instantaneous rate of change be negative? How do you find the instantaneous rate of change at a point on a graph? How does instantaneous rate of change differ from average rate of change? See all questions in Instantaneous Rate of Change at a Point Impact of this question 1675 views around the world You can reuse this answer Creative Commons License