17. What is the simplified average rate of change between x = 2and x = 2 + h for the function: Æ’(x) = x2 - 3x?
18. Based on your result from above, what is the slope of thetangent to f(x) at the point when x = 2?
19. Find the slope of the tangent line to f(x) = 2x4+1   when  x = 2 using firstprinciples.
20. Use your answer from 19) to determine the equation(in the form of y=mx+b) of the tangent line to f(x) atx=2.
16. Determine the limit by showing all your steps, if it exists.limx→255−x√25−x
15. Find the point(as an ordered pair) on thecurve  f(x)=−4x^2−3 at which there exists a tangent withslope of 4. Show your work using first principles.
14. Determine the slope of the tangent to the curvey=3x^3+4x  at the point  ( 1 , 7 ) using firstprinciples.
13. The population growth P(t) in a community is projected tofollow the function
P= 7t2 + 5t + 350 , where t is time in years.Estimate the instantaneous rate of growth in the 5thyear by showing all of your steps on paper.
12. The population growth, P(t) in a community is projected tofollow the function
P(t) = 7t2 + 5t + 350, where t is time in years. Findthe average rate of growth from the 2nd to the5th year.
11. What happens when a limit does not equal the same value fromthe left and the right, such as:limx→3+f(x) = −4limx→3−f(x) =2?
