ADAU, CALCULUS-1, HOMEWORK-4, FALL2016
Due December 21, 2016, Wednesday @16:00
Submit problems 1 (item b), 4, 9, 16, 20 (items b and f )
1. Find the extreme values (absolute and local) of the function and at which points of domain they
a. y = x3 (x
ADAU, CALCULUS-1, HOMEWORK-2, FALL2016
Due October 31, 2016 17:00
1. Let f (x) = ax + b and g(x) = cx + d. What condition must be satisfied by constants a, b, c, d in
order that (f g)(x) = (g f )(x) for every value of x?
2. Find the average rate of change
ADAU, CALCULUS-1, HOMEWORK-3, FALL2016
Due December 3, 2016 @ 16:00 (Friday)
1. Given a function f (x) = x1 ,
a. find the derivative f 0 (x) of f (x).
b. Graph f and f 0 side by side using separate sets of coordinate systems.
c. For what values of x, if a