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Find the length and width of a rectangle that has an area of 64 square feet and a minimum perimeter.
Please sketch a graph of a function f have the indicated characteristics. Please explain.
Profits for regular soft drink are $3.00 per case and profits for diet soft drink are $2.00 per case. What is the optimal daily profit?
S represents weekly sales of a product. What can be said of S' and S'' for each of the following?
Formulate a linear program that will give the least cost capacity expansion plan.Consider the polyhedron P
If x = c is a critical number of the function f, then it is also a critical number of the function g(x) = f(x) + k where k is a constant.
Formulate a linear programming model that can be used to determine a minimum-cost staffing plan for PharmaPlus.
Show that there is a point P with x-coordinate 3 at which the line tangent to the curve at P is horizontal. Find the y-coordinate of P.
Formulate a linear programming model that can be used to determine the maximum possible profit contribution for the grower.
If the graph of a function has three x intercepts, then it must have at least two points at which its tangent line is horizontal.
Use a graphing utility to graph f and g in the same window and determine which is increasing at the faster rate for "large" values of x.
Determine the optimal product mix using the Management Scientist software.
Use logarithmic differentiation to find the derivative of the function. Differentiate f and find the domain of f.
Solve the foregoing problem by the simplex method (not the dual -simplex). At each iteration, identify the dual variable values and show which dual constraints
The material for the top and bottom costs 2 cents per square cm and the material for the side costs 1 cent per square cm.
Formulate a linear programming model that can be used to determine the production schedule for the two products for the current period.
Find y such that the total amount of power line from power supply to the factories is a minimum.
Determine the number of reservations that can be accommodated in each rental class and whether the demand by any rental class is not satisfied.
Determine an equation for the line tangent to the graph of y= xe^x at the point on the graph were x=2.
Determine the optimal plan that minimizes the total manufacturing and purchasing costs,
Determine the optimal floor space allocation and the resulting total contribution to profit.
Find the numerical version of each expression, use definitions of hyperbolic functions to find each.
Determine the optimal production schedule using the Management Scientist software.
Perform a linear regression on the data. What is the linear model that best fits the data? (Round all constants to the nearest tenth.)