3)Calculate the average rate of change of the given function over the given interval x 0...

Calculate the average rate of change of the given function f over the intervals [a, a...

Calculate the average rate of change of the given function f over the intervals [a, a + h] where h = 1, 0.1, 0.01, 0.001, and 0.0001. f(x) = 8x2;  a = 0 h = 1     h = 0.1     h = 0.01     h = 0.001     h = 0.0001    

Calculate the average rate of change of the given function f over the intervals [a, a...

Calculate the average rate of change of the given function f over the intervals [a, a + h] where h = 1, 0.1, 0.01, 0.001, and 0.0001. (Technology is recommended for the cases h = 0.01, 0.001, and 0.0001.) HINT [See Example 4.] (Round your answers to five decimal places.) f(x)=7/x; a=2

Calculate the average rate of change of the given function f over the intervals [a, a...

Calculate the average rate of change of the given function f over the intervals [a, a + h] where h = 1, 0.1, 0.01, 0.001, and 0.0001. (Technology is recommended for the cases h = 0.01, 0.001, and 0.0001.) HINT [See Example 4.] (Round your answers to seven decimal places.) f(x) = x^2/4 ; a = 1 h = 1    h = 0.1      h = 0.01      h = 0.001 h = 0.0001

Calculate the average rate of change of the given function f over the intervals [a, a...

Calculate the average rate of change of the given function f over the intervals [a, a + h] where h = 1, 0.1, 0.01, 0.001, and 0.0001. (Technology is recommended for the cases h = 0.01, 0.001, and 0.0001.) HINT [See Example 4.] (Round your answers to five decimal places.) f(x) = 3 x ; a = 4

Let f(x) = 2x2 + nx – 6 and g(x) = mx2 + 2x – 4....

Let f(x) = 2x2 + nx – 6 and g(x) = mx2 + 2x – 4. The functions are combined to form the new functions h(x) = f(x) – g(x). Points (2, 4) and (-3, 17) satisfy the new function. Determine the values of m and n

7. For the random variable x with probability density function: f(x) = {1/2 if 0 <...

7. For the random variable x with probability density function: f(x) = {1/2 if 0 < x< 1, x − 1 if 1 ≤ x < 2} a. (4 points) Find the CDF function. b. (3 points) Find p(x < 1.5). c. (3 points) Find P(X<0.5 or X>1.5)

Given the function and the bounded interval, f x( )= x3 −6x2 − 45x+ 4 [-5,10]...

Given the function and the bounded interval, f x( )= x3 −6x2 − 45x+ 4 [-5,10] F. The interval where the function is concave down is _______. G. The interval where the function is concave up is __________. H. The global maximum value in the bounded interval [-5, 10] is __________. (y coordinate). I. The global minimum value in the bounded interval [-5, 10] is ___________. (y coordinate). Show your work please.

Differentiate the function. a) f(x) = x5 − 4x + 5 b) h(x) = (x −...

Differentiate the function. a) f(x) = x5 − 4x + 5 b) h(x) = (x − 5)(4x + 13) c) B(y) = cy−9 d) A(s) = −14/s^5 e) y = square root/x (x-8) f) y = 8x^2 + 2x + 6 / square root/x g) g(u) = square root/6u + square root/5u h) H(x) = (x + x^−1)^3

Given the following cumulative probability function: 0 x < -5 .10 -5 <= x < 0...

Given the following cumulative probability function: 0 x < -5 .10 -5 <= x < 0 .40 0 <= x < 5 F(x)= .50 5 <= x < 10 .75 10 <= x < 15 1.0 X >= 15 a. P( 0 <x<10) b. P( 5<x<10) c. P(x< 10) d. P(x>5) e. P(x=7) f. Calculate f (x) and draw F (x) and F (x) g. Calculate E (x) h. Calculate the variance of X i. Calculate the expected g (x)...

Consider the function f(x)=5x−4 and find the following: a.) The average rate of change between the...

Consider the function f(x)=5x−4 and find the following: a.) The average rate of change between the points (−1,f(−1)) and (2,f(2)). b.) The average rate of change between the points (a,f(a)) and (b,f(b)). c.) The average rate of change between the points (x,f(x)) and (x+h,f(x+h)).