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Problem on Indefinite Integral.Provide complete and step by step solution for the question and show calculations and use formulas.
Linear Programming : Using the Simplex Method to Minimize C.In this problem I am trying to get rid of the artificial variable using the two phase method.
Create and solve a linear program which maximizes Sunco's daily profits. What are the optimum decisions,
What are some methods to approximate the value of an integral when it cannot be calculated directly?
Create an integer linear program that tells you how many shares of which stock to sell in order to get the cash
Create and solve a linear programming model for determining the leasing schedule that provides the required amounts of space at minimum cost.
Use the Rayleigh-Ritz method to find two successive approximate solutions to the extremum problem associated with the functional.
How would you decompose the problem above the take advantage of such fast subroutine?
Linear Programming : Adjacency of Basic Feasible Solution and Hyperplanes.Can anyone finish up this proof by continuing my preliminery work?
Find the expansions of the solutions of x^2 + (4+epsilon) x + 4 - epsilon = 0 around epsilon = 0.
Ignoring resistance, a sailboat starting from rest accelerates at a rate proportional to the difference between the velocities of the wind and the boat.
Explain how we arrive at the formula for Simpson's rule (standard formula) using the Lagrange Interpolating Polynomial of degree 2.
Cart A is being pulled away from Q at a speed of 2 ft/sec. How fast is cart B moving toward Q at the instant cart A is 5 feet from Q?
Let f: [a,b] --> R, a < b, twice differentiable with the second derivative continuous such that f(a)=f(b)=0.
Let f(x) be a continuous function of one variable. Give the definition of the derivative.
For y= 0.5, solve for x to get (2) x(t) then take a (partial) derivative of x(t) to get the rate of change of x which is the velocity of the wave.
The Maclaurin series for the inverse hyperbolic tangent is of the form x+x^3/3+x^5/5...x^7/7. Show that this is true through the third derivative term.
Prove that if f(x) = x^alpha, where alpha = 1/n for some n in N (the natural numbers), then y = f(x) is differentiable and f'(x) = alpha x^(alpha - 1).
This machine costs £C to lease each week according to the formula and t is the number of hours per week worked by the machine.
In the above example, let c1 be the objective function coefficient of . Determine the optimal z-value as a function of c1.
State the differential equation of the orthogonal family, and show your steps in obtaining a solution.
Use calculus to find the value of x so that V is as large as possible. Justify your answer. What is the largest possible value of the volume?
The optimal value function of a portfolio analysis problem solved using quadratic programming is __________________.
Let A€R mxn . Prove that one of the following systems has a solution but not both:
Solve the following two equations. In each case, determine dy/dx:Is this right? y'=x(-sin)(2x^2)(4x)