Find the critical point(s) of the function. Then use the second derivative test to classify the nature of each point, if possible. Finally, determine the relative extrema of the function.
A) (0, - 1); relative minimum value: f(0, - 1) = - 4
B) (0, 0); saddle point: f(0, 0) = 4
C) (1, 0); relative maximum value: f(1, 0) = 1
D) there are no critical points

Question

Find the critical point(s) of the function. Then use the second derivative test to classify the nature of each point, if possible. Finally, determine the relative extrema of the function. 
A) (0, - 1); relative minimum value: f(0, - 1) = - 4 
B) (0, 0); saddle point: f(0, 0) = 4 
C) (1, 0); relative maximum value: f(1, 0) = 1 
D) there are no critical points

Quizplus · Accepted Answer

The Answer of Find the critical point(s) of the function. Then use the second derivative test to classify the nature of each point, if possible. Finally, determine the relative extrema of the function. 
A) (0, - 1); relative minimum value: f(0, - 1) = - 4 
B) (0, 0); saddle point: f(0, 0) = 4 
C) (1, 0); relative maximum value: f(1, 0) = 1 
D) there are no critical points

Find the Critical Point(s) of the Function