Problem #5: The graph off is given to the right. 3 Let g(x) = sod. 2 v=f(x) 1 -3 -2 1 -1 0 -1 X -2 (a) Find g(3). (b) Find g'(-2). (c) Find g"(1). (d) On what interval is g decreasing?
#4 and 5 Thank you! Problem 4 & 5: Find the slope of the graph off at the given point. 4. f(x) = 5 – 3x (1, -2) 5. f(x) = V + 2 (9,5)
rDashboard TP Ho : Proble 5 is a graph off(x) 0 5 What is the average value of f(x) on 0 3x 3 2? avg value = Problem 8 Problem 9 Problem 10 Problem 11 What is the average value of g(x) on 0 x3 2? Help Week 11 38df2c8d-68c0-3058-a0e6-747705c7fee0 781ebda3-... 5.2-5.4/12/?effectiveUser-84706399&use a https://math-webwork2.unl.edu/webwork2 files/tmp/10.. lem 12 (x), and below to the right is g(x). f(x) &(x) File Edit Apps (1 point) The figure below to the left is a...
Problem #5: A loan of $28,000 is paid off in 36 payments at the end of each month in the following way: Payments of $700 are made at the end of the month for the first 12 months. Payments of $700 + x are made at the end of the month for the second 12 months. Payments of $700 + 2x are made at the end of the month for the last 12 months. What should x be if the...
Problem #5: A loan of $60,000 is paid off in 36 payments at the end of each month in the following way: Payments of $1500 are made at the end of the month for the first 12 months. Payments of $1500 + x are made at the end of the month for the second 12 months. Payments of $1500 + 2x are made at the end of the month for the last 12 months. What should x be if the...
Problem 2 Let f(x) = sin 2x and P() be the interpolation polynomial off with degree n at 20,***, Im Show that \,f(z) – P() Sin+1 – 20) (1 - 11). (I – In).
Find the difference quotient and simplify. s(x)8x2-8r+5 The difference quotient off(x) is □ Find the difference quotient and simplify. s(x)8x2-8r+5 The difference quotient off(x) is □
Problem 4 if the Wronskian W off and g is 3e**, and if f(x) = e2*, find g(x).
Problem # 10, Let X be a random variable with CDF: 0 (x + 5)2/144-5 < x < 7 Ex (x) = X(r Find E(X], , and E[X"].
Problem #2 (5 pts) The sample mean of 13 bowling balls measured off the manufacturing line is 10.12 lbf with a sample variance of 0.28 lbf2. Determine the range that contains the true standard deviation of all the bowling balls made at 90 % confidence in N. (Hint: use -distribution to get range for sample variation)