Use Bayes' rule to find the indicated probability.Two shipments of components were received by a factory and stored in two separate bins. Shipment I has 2% of its contents defective, while shipment II has 5% of its contents defective. If it is equally likely an employee will go to either bin and select a component randomly, what is the probability that a defective component came from shipment II?

Find the surface area of the surface S.S is the surface x2 + 5z = 0 that lies above the region bounded by the x-axis,  and y = x.

A. 13
B. 26
C.
D.

An objective function and a system of linear inequalities representing constraints are given. Graph the system of inequalities representing the constraints. Find the value of the objective function at each corner of the graphed region. Use these values to determine the maximum value of the objective function and the values of x and y for which the maximum occurs.Objective Functionz = 7x + 9yConstraintsx ? 0 0 ? y ? 5 2x + 3y ? 12 2x + 3y ? 20

A. Maximum: 59; at (2, 5) B. Maximum: 70; at (10, 0) C. Maximum: -28; at (4, 0) D. Maximum: 42; at (6, 0)

Translate the following into an equation where x represents the unknown number. Then solve the equation for x. times a number is 8.  

A. 5x = 8, x = 12
B. 5x = 8, x = 
C. x = 8, x = 40
D. x = 8, x = 1

Complete the ordered pairs for the given linear equation. Then plot the points and graph the equation by connecting the points.4x + y = 5(0,), (1,), (-1,)

A. (0, 0), (1, -5), (-1, 5)

B. (0, 5), (1, 1), (-1, 9)

C. (0, -5), (1, -9), (-1, -1)

D. (0, 5), (1, 9), (-1, 1)