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 = 14x - 23yConstraints0 ? x ? 5 0 ? y ? 8 4x + 5y ? 30 4x + 3y ? 20

Find the slope of the curve at the given point P and an equation of the tangent line at P.y = x3 - 5x, P(1, -4)

A. slope is 3; y = 3x - 7 B. slope is -2; y = -2x - 2 C. slope is -2; y = -2x D. slope is 3; y = 3x - 3

Solve the system of equations graphically.Northwest Molded molds plastic handles with a production cost of $0.60 per handle to mold. The fixed cost to run the molding machine is $6372 per week. If the company sells the handles for $3.60 each, how many handles must be molded and sold weekly to break even?

A. 1416 handles B. 1517 handles C. 10,620 handles D. 2124 handles

Find the limit if it exists.

A.
B. -
C. 69
D. -69

Solve and check. Begin by using the addition or multiplication principles of equality to isolate the squared term. x2 - 100 = 0

A. ±10 B. 52.5 C. 10 D. ±9