Mathematics, 18.07.2019 02:10 cravingnafi202
Consider the following lp (). min zeta = x_1 - 3x_2 - 5x_3 s. t. x_1 - 3x_2 greaterthanorequalto 3 (y_4) 7x_1 + 2x_2 + 5x_3 lessthanorequalto 20 (y_5) x_1 greaterthanorequalto 0; x_2 lessthanorequalto 0; x_3 greaterthanorequalto 0. reformulate lp () into a canonical form such that x_1 and x_2 are on the right-hand-side of the equations and x_3 is on the left-hand-side. there may exist multiple canonical forms that satisfy the above requirements and you only need to find one. the variables y_4 and y_5 are shadow prices of constraints (7) and (8). respectively. one possible solution is (x^*_1 = 0, x^*_2 = - l. x^*_3 = 4.4) and the shadow price is (y^*_4 = 1/3, y^*_5= -1). prove that the alleged solution (x^*_1 = 0. x^*_2 = - l, x^*_3 = 4.4) given in problem (1) is indeed optimal to lp (). do not assume without verification that the alleged shadow price (y^*_4 = 1/3, y^*_5 = -1) is the optimal dual solution.
Answers: 1
Mathematics, 21.06.2019 18:00
When lulu enlarged her drawing of a rabbit, the enlarged picture appeared to be distorted. which statement about the transformation applied to her drawing is true?
Answers: 2
Mathematics, 21.06.2019 19:00
Simplify. −4x^2 (5x^4−3x^2+x−2) −20x^6−12x^4+8x^3−8x^2 −20x^6+12x^4−4x^3+8x^2 −20x^8+12x^4−4x^2+8x −20x^6+12x^4+4x^3−8x^2
Answers: 1
Mathematics, 21.06.2019 23:40
Will give brainliest b. describe the function over each part of its domain. state whether it is constant, increasing, or decreasing, and state the slope over each part.
Answers: 1
Consider the following lp (). min zeta = x_1 - 3x_2 - 5x_3 s. t. x_1 - 3x_2 greaterthanorequalto 3 (...
Mathematics, 14.03.2020 00:05
Mathematics, 14.03.2020 00:05
Computers and Technology, 14.03.2020 00:06
Mathematics, 14.03.2020 00:06
Advanced Placement (AP), 14.03.2020 00:06
History, 14.03.2020 00:08
Mathematics, 14.03.2020 00:08