Suppose that https://webwork2.asu.edu/webwork2_fi...f8cd582f51.png.

Note:Several parts of this problem require answers entered in interval notation. Note, with interval notation, you can enter the empty set as https://webwork2.asu.edu/webwork2_fi...86e4d5e9e1.png.

(A) List all the critical values of https://webwork2.asu.edu/webwork2_fi...910e13a9c1.png. Note: If there are no critical values, enterNONE.

(B) Use interval notation to indicate where https://webwork2.asu.edu/webwork2_fi...910e13a9c1.png is increasing.

Increasing:

(C) Use interval notation to indicate where https://webwork2.asu.edu/webwork2_fi...910e13a9c1.png is decreasing.

Decreasing:

(D) List the https://webwork2.asu.edu/webwork2_fi...dd0b8b8e91.png values of all local maxima of https://webwork2.asu.edu/webwork2_fi...910e13a9c1.png. If there are no local maxima, enterNONE.

https://webwork2.asu.edu/webwork2_fi...dd0b8b8e91.png values of local maximums =

(E) List the https://webwork2.asu.edu/webwork2_fi...dd0b8b8e91.png values of all local minima of https://webwork2.asu.edu/webwork2_fi...910e13a9c1.png. If there are no local minima, enterNONE.

https://webwork2.asu.edu/webwork2_fi...dd0b8b8e91.png values of local minimums =

(F) Use interval notation to indicate where https://webwork2.asu.edu/webwork2_fi...910e13a9c1.png is concave up.

Concave up:

(G) Use interval notation to indicate where https://webwork2.asu.edu/webwork2_fi...910e13a9c1.png is concave down.

Concave down:

(H) List the https://webwork2.asu.edu/webwork2_fi...dd0b8b8e91.png values of all the inflection points of https://webwork2.asu.edu/webwork2_fi...faee426371.png. If there are no inflection points, enterNONE.

https://webwork2.asu.edu/webwork2_fi...dd0b8b8e91.png values of inflection points = (I) Use all of the preceding information to sketch a graph of https://webwork2.asu.edu/webwork2_fi...faee426371.png. Include all vertical and/or horizontal asymptotes. When you're finished, enter a "1" in the box below.