14 (ALL PARTS) AND THEN 15 (ALL PARTS)
Posted: Thu Jul 14, 2022 4:09 pm
14 (ALL PARTS) AND THEN 15 (ALL PARTS)
14. A partial graph of the function f(x)=21x3 Since f is one-to-one, the inverse function (1) Sketch the graph of g⋅(221 points) (use a colored pencil please) (2) Find f′(x). (1 21 points) (3) g′(−14). (4 points)
(11 points) 15. At the right (on an unmarked view window) is a partial graph of h(x)=2sinx−cos2x (1) Find h(61π)⋅(2 points) (2) Show the derivative simplifies to h′(x)=2cosx(1+2sinx)⋅(3 points) (3) For 0≤x≤23π, find the x value(s) for any absolute max and/ or min on h(x). Justlfy in table format as demonstrated in class (6 points)
(3) For 0≤x≤23π, find the x value(s) for any absolute max and/ or min on h(x). Justify in table format as demonstrated in class (6 points) Absolute Max occurs when x= Absolute Min occurs when x=
- 14 All Parts And Then 15 All Parts 1 (36.03 KiB) Viewed 34 times
(11 points) 15. At the right (on an unmarked view window) is a partial graph of h(x)=2sinx−cos2x (1) Find h(61π)⋅(2 points) (2) Show the derivative simplifies to h′(x)=2cosx(1+2sinx)⋅(3 points) (3) For 0≤x≤23π, find the x value(s) for any absolute max and/ or min on h(x). Justlfy in table format as demonstrated in class (6 points)
(3) For 0≤x≤23π, find the x value(s) for any absolute max and/ or min on h(x). Justify in table format as demonstrated in class (6 points) Absolute Max occurs when x= Absolute Min occurs when x=