<11 - 3x + y 2 3 Graph the feasible region for the follow system of...
Graph the feasible region for the follow system of inequalities by drawing a polygon around the feasible region. Click to set the corner points. ( 2x +5g < 4x + 4y < > 30 36 0 HD > 0 - + 5 6 7 8 9 10 Clear All Draw: Polygon Points possible: 3 This is attempt 1 of 3.
plied 12- Q Q 10 For the system of 3x +y<8 inequalities, graph the solution region and 3x-y> - 2 identify the corners of the x20, y20 region. Use the graphing tool to graph the system. 8 9 6 2- Click to enlarge graph -2 What are the comer points? --- (Use a comma to separate answers as needed. Type ordered pairs. Type integers or fractions.) -10-
This Question: 2 pts 13 of 42 Graph the feasible region for the system of inequalities. Tell whether the region is bounded or unbounded. 5x + 4y > 20 2x - 3y <6 Osys X20 Use the graphing tool to graph the system. Click to enlarge graph The region is bounded.
Graph the feasible region. −x + y ≤ 0, x ≤ 5, y ≥ -2 Find all corner points. there is 3 in all. (Order your answers from smallest to largest x, then from smallest to largest y.)
(-2<x<3 21 Graph the feasible region for the system-15y 35 (2x + y<6
(1 point) Given the system of inequalities below, determine the shape of the feasible region and find the vertices of the feasible region. x + y = 6 2x + y 2 10 x + 2y 27 x 20 y20 The shape of the feasible region: Quadrilateral List the vertices (as a list of points such as "(2,3), (5,7), (0,0)"):
(2 points) Given the system of inequalities below, determine the shape of the feasible region and find the vertices of the feasible region. Give the shape as "triangle", "quadrilateral", or "unbounded". Report your vertices starting with the one which has the smallest x-value. If more than one vertex has the same, smallest x-value, start with the one that has the smallest y-value. Proceed clockwise from the first vertex. Leave any unnecessary answer spaces blank I+y<5 2.1 + y<7 I >...
Question 5: Graph the inequality. y> 3x² + 3x - 5 Question 6: Determine graphically, the solution region for the two inequalities. y > 22 - 3x - 6 and y> 2x2 + 7x + 6 Question 7: Solve the inequality algebraically and show the solution in interval form. x² + 2x - 3 > 0 Question 8: Solve the inequality algebraically and show the solution in interval form. 2x2 - 6x - 9> 11
Use the method of slack variables to find the vertices of the feasible region in R2 from Assignment 8, defined by the inequalities x + 2y ≤ 4, 3x + 2y ≤ 6, x, y ≥ 0 (a) Introduce slack variables and turn the system of inequalities into a linear system. (b) Use Gauss-Jordan elimination to find the basic solution corresponding to the basic variables x1 and x4 and the basic solution corresponding to the basic variables x1 and x2....
Use the method of slack variables to find the vertices of the feasible region in R2 from Assignment 8, defined by the inequalities +2y4 3r+2y6 r, y 20 r+ 2y = 4 -3x +2y 6 3 (0, 2) (1,) 2 1 (0,0) 120 2 4 (a) Introduce slack variables and turn the system of inequalities into a linear system. (b) Use Gauss-Jordan elimination to find the basic solution corre- sponding to the basic variables a and r4 and the basic...