Question

Which term best describes the solution of the situation represented by the system of inequalities? (Assume that x is greater than or equal to 0 and y is greater than or equal to 0.)

Answer 1

\[x+2y \le 4\]\[x-y \le 1\]\[f(x,y)=3x+2y\]

Answer 2

This is the same problem type as before

Answer 3

It is? I graphed it and found three intersection points, but one is (0,-1). Would that count?

Answer 4

"Which term" Implies options to Choose from.

Answer 5

There's no way to help you without you listing the
choices.

Answer 6

Oh, sorry....I was finishing the second problem

Answer 7

Alternate optimal solutions
one optimal solution
infeasible
unbounded

Answer 8

I think alternate optimal solutions...?

Answer 9

Why do you think A is the proper choice?

Answer 10

Bleh...because there are two feasible options? There are those two intersection points that follow the \(x \ge 0\) and \(y\ge0\) thing...

Answer 11

I'm not entirely positive.

Answer 12

There's likel yonly one optimal solution for this one. you can test it which solution is optional by inserting the possible points into the equation that Represents the feasible region.

Answer 13

There Can only be one feasible region for the given set of inequalities

Answer 14

Ah, thank you for your help. I gotta get going!

Answer 15

Sorry for the slow response time . It is difficult to use this site on a tablet.

Answer 16

It's alright :) I can imagine it would be lol

Answer 17

My Bluetooth keyboard should be arriving soon. Thaf will make it easier I think

Answer 18

That's good :) Anyhoo, have a good evening!