How do you find the average rate of change of #f(x) = tan(x)# from #x=0# to #x=pi/4#? Calculus Derivatives Average Rate of Change Over an Interval 1 Answer Wataru Sep 13, 2014 The average rate of change of #f(x)=tanx# is #{f(pi/4)-f(0)}/{pi/4-0}=1/{pi/4}=4/pi# Answer link Related questions How do you find the average rate of change of a function from graph? How do you find the average rate of change of a function between two points? How do you find the average rate of change of #f(x) = sec(x)# from #x=0# to #x=pi/4#? How do you find the rate of change of y with respect to x? How do you find the average rate of change of #y=x^3+1# from #x=1# to #x=3#? What is the relationship between the Average rate of change of a fuction and derivatives? What is the difference between Average rate of change and instantaneous rate of change? What does the Average rate of change of a linear function represent? What is the relationship between the Average rate of change of a function and a secant line? What does average rate of change tell you about a function? See all questions in Average Rate of Change Over an Interval Impact of this question 8820 views around the world You can reuse this answer Creative Commons License