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What are the decision variables?What is the objective function?
A sheet of standard U.S typing paper measures 8.50 inches x 11.0 inches. What are these dimensions in centimeters?
Complex Exponentials: Simply the following expression and give your answer both in polar and rectangular form.
Find where is the function f(z) = 1/((2z-1)(Log(2z)) analytic, and then find all residues in all isolated singular points.
What is the optimal value of the objective function?
Compute the average cost of coal in cents per million BTUs for each generating unit (a measure of the cost of fuel for the generating units).
Air pollution control specialists in southern California monitor the amount of ozone, carbon dioxide, and nitrogen dioxide in the air on an hourly basis.
What are complex numbers? What does imaginary parts of equal magnitude and opposite signs mean?
Is it possible to apply the foil method when multiplying complex numbers? Explain your answers.
For each of the functions f(z) find the Laurent Series expansion on 0<|z-zo|
To find the optimal solution to a linear programming problem using the graphical method
From a rectangular sheet of metal measuring 120mm by 75mm, equal squares of side x are cut from each of the four corners.
Forecasting and Linear programming problems.. The number of pizzas ordered on Friday evenings between 5:30 and 6:30 at a pizza delivery
Evaluate the integral from zero to infinity of [sin(x) - x]/x^3 dx using both complex analysis and Ramanujan's master theorem.
The standard textbook way to compute the integral of sin(x)/x from minus infinity to plus infinity is to replace this integral by the principal value.
Formulate a linear program to help the farmer find the maximizing plan to run the farm.Discuss if this linear model is a good approximation of the reality
Let Q=(0,7) and R=(10,11) be given points in the plane. We want to find the point P=(x,0) on the x-axis such that the sum of distances PQ+PR.
Show graphs (shaded regions) in the w-plane and identify the images of the half-lines x=1 (y=0) and y=0 (x=1).
Compute the dual prices for given constraints.The initial probability of success was 1 in 3 or .333. Now the contestant is down to two doors
Improvement in the value of the optimal solution per unit increase in right hand side, a dual price cannot be negative
Linear Programming using the graphical method.Solve the following linear programming problem using the graphical solution procedure:
Polar coordinates of a particular point are r=4, 0=pi/3. I need to ind the rectangular coordinates of the point.
X and y represents rectangular coordinates. What is the given equation using polar coordinates (r, theta). x^2 = 4y
Find the volume of the solid formed by revolving the region bounded by the graphs of y=2(x^2), x=0 and y=2 about the y-axis.
Use the Monotonocity Theorem to determine where the given function is concave up and where it is concave down.