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## Topic review (newest first)

bobbym
2013-01-20 13:53:16

Okay, and thanks for stopping by.

phrontister
2013-01-20 13:48:35

Thanks...I'm happy with the code. Runs in the blink of an eye, too.

Must go now. Catcha L8r...

bobbym
2013-01-20 13:27:30

Ahhhhhh! Nice neat code by the way.

phrontister
2013-01-20 13:18:41

FWIW = For what it's worth.

Re post #5: I looked at it but let it go because I was going cross-eyed (my fault, not scientia's).

bobbym
2013-01-20 13:11:11

Hi phrontister;

FWIW?

Yes, a program will solve many math problems. Nice solution up there in post #5 too.

phrontister
2013-01-20 13:03:25

Hi Bobby and scientia,

FWIW, here's what I did.

I don't understand your more advanced concepts, but I'm happy that I could scratch away and get the right answer.

That tiny M code is amazing! The right tool for the task.

bobbym
2013-01-20 12:42:45

Hi;

Interesting doing math with the flu.
Read 270 as 220 and added numbers up wrong. Particularly annoying because my method is pure genius. Not mine, but... Anyway 870 is correct.

What method did you use?

This is a linear optimization problem, sometimes called linear programming.

This is the cost function:

15 n + 12 m

subject to the constraints

4 n + 3 m >= 220

3 n + 4 m >= 270

2 n + 5 m >= 250

You can solve it with the simplex method and Geogebra makes the graphing easy, or just punch this in to M

Minimize[{15 n + 12 m, 4 n + 3 m >= 220, 3 n + 4 m >= 270, 2 n + 5 m >= 250}, {n, m}]

scientia
2013-01-20 12:22:37

Suppose the order is for
of Platter A and
of Platter B. Then we have:

We want to minimize
subject to the above constraints. Let us then rewrite the above inequalities in terms of
and one of
and
, say
.

The 1st and 2nd inequalities give
, the 1st and 3rd inequalities give
, and the 2nd and 3rd inequalities give
. The minimum appears to be 855 – however
would imply
, which does not satisfy the 2nd inequality. So we must instead have
. Thus the minimum cost is \$870 dollars for 10 of Platter A and 60 of Platter B.

phrontister
2013-01-20 10:13:00

Hi Bobby,

I didn't know how to go about this other than by examining all the possibilities with LB. What method did you use?

phrontister
2013-01-18 23:52:08

Hi cooljackiec,

I couldn't think of a mathematical way of doing this, so programmed it in LibertyBASIC.

bobbym
2013-01-18 14:31:16

Hi;

cooljackiec
2013-01-18 11:39:06

The Phony Bologna Meat Company offers two platters. Platter A comes with 4 hamburgers, 3 hot dogs, and 2 pig's feet, and costs \$15. Platter B comes with 3 hamburgers, 4 hot dogs, and 5 pig's feet, and costs \$12.

A picnic organizer requires 220 hamburgers, 270 hot dogs, and 250 pig's feet. (There can be leftovers, but these are the minimum requirements.) What is the minimum cost (in dollars)?