2. Minimize: C-2x+5) Subject to: 4x+y 240 2? + ? 230 x+3y 2 30 x20,y20 ) Type in the corner points found and their corresponding Cost b) What is the minimum cost?
30 Minimize 2 = 3α + 4y 3y + 5Σ 6y + 4αΣ Subject to y + Ε ΔΙ ΔΙ ΛΙ ΔΙ ΛΙ 40 8 2 O y O Minimum is at τ = 9-
(1 point) Find the minimum and maximum of the function z-6x - 4y subject to 6x-3y 15 6x +y < 49 What are the corner points of the feasible set? The minimum is and maximum is . Type "None" in the blank provided if the quantity does not exist.
Quiz: Quiz 2 This Question: 1 pt Minimize the objective function 3x+3y subject to the constraints 2xty 2 13 x+2y 2 14 x20, y20 The minimum value of the function is Simplify your answer.) The value of x is Simplify your answer.) The value of y is Simplify your answer.)
Quiz: Quiz 2 This Question: 1 pt Minimize the objective function 3x+3y subject to the constraints 2xty 2 13 x+2y 2 14 x20, y20 The minimum value of the function...
6. Let Y be a random variable with p.d.f. ce-4y for y20 (a) Determine c. (b) What is the mean, variance, and squared coefficient of variation of Y where the squared coefficient of variation of Y is defined to Var(Y)/(E[Y)2? (c) Compute PríY < 5) (d) Compute PrY >5 |Y>1) (e) What is the 0.7 quantile (or 70th percentile) where the 0.7 quantile is the point q such that Pr(Y > q} 0.7?
Mathematical model of a system is y" + 4y' + 3y = 2r(). Write system transfer function. 2 R 52 +3s 4 2 R s2 +4s +3 4 R 2+2s+3 R s2 +2s +3
We will use u and v as our dual variables. Maximize 12x +15y subject to 5x+4y < 40 Given the following Maximize 3x +2y < 36 x,y 20 Set up the dual problem The dual objective function is One constraint is Another constraint is The variables are You are given the following problem; Maximize 10x+15y subject to 6x+3y < 96 x+y = 18 X.y 20 Based on this information which tableau represents the correct solution for this scenario?
Consider the following linear programming problem: Minimize 20X + 30Y Subject to: 2X + 4Y ≤ 800 6X + 3Y ≥ 300 X, Y ≥ 0 What is the optimum solution to this problem (X,Y)? A) (0,0) B) (50,0) C) (0,100) D) (400,0)
8 Minimize z= x + 3y 9 + 22 54 + 4yΣ Subject to 2y + 2 > ΛΙ ΛΙ ΛΙΛΙ ΛΙ 14 O Σ Ο Minimum is Maximize z = 4x + 2y 32 + 4y < < 32 5x + 5y < Subject to 0 VI VI ALAI y 0 Maximum is
(1 point) The planes 3x + 4y + z = 2 and 3x – 3y = -18 are not parallel, so they must intersect along a line that is common to both of them. The vector parametric equation for this line is L(t) =