Beach Cruises Prints Brochures And Flyers To Advertise
Linear programming help algae problems? ۔
I need help with this problem.
Gift shop managers print brochures and flyers to promote items on sale. It costs $ 8 to print each brochure and 9 cents to print each brochure. One brochure requires 3 pages and one brochure 2 pages. Managers do not want to use more than 600 pages, at least 50 brochures and 150 brochures. How much does it cost to keep costs low?
I have 6 steps to take.
Explain the variable
Write the inequality
Graphic system
Write the equation
The cost of change.
Answer the problems
Help,
x = number of issues y = number of issues.
If you want at least 50 brochures, then x 50 and if you want at least 150 brochures, then y 150.
Now we count the number of pages:
3x + 2y Â600 Because the number of pages in each booklet is multiplied by the number of booklets and the number of pages in each booklet is multiplied by the number of booklets, the number of desired pages becomes smaller or larger. Or equal to 600.
Now let's consider:
f (p) = 8.00x + 0.09y.
Each brochure costs $ 8 and each brochure costs $ 0.09. So if you multiply the number of brochures by 8 and multiply it by the number of brochures by 0.08, you get the number of e that you want to calculate.
This equation can help you!
Beach Cruises Prints Brochures And Flyers To Advertise
Beach Cruises Prints Brochures And Flyers To Advertise
Linear programming help algae problems? 3
I need help with this problem.
The gift shop manager prints brochures and flyers to promote the items on sale. It costs $ 8 to print each brochure and 9 cents to print each brochure. A brochure requires 3 pages and a brochure requires 2 pages. Managers do not want to use more than 600 pages, at least 50 brochures and 150 brochures. How much does it cost to keep costs low?
I have 6 steps to take.
Explain the variable
Write the inequality
Graphic system
Write the equation
The value of change
Answer the problems
Help,
x = number of issues y = number of issues
You want at least 50 brochures, so x 50 and you want at least 150 brochures, so 150
Now we count the number of pages:
3x + 2y Â600 Because the number of pages per booklet is multiplied by the number of pages in the booklet and the number of pages per booklet is multiplied by the number of booklets, the number of pages required becomes smaller or larger. Or equal to 600
Now consider:
f (p) = 8.00x + 0.09y
Each brochure costs $ 8 and each brochure costs $ 0.09. So if you multiply the number of brochures by 8 and multiply it by the number of brochures by 0.08, you get the number of e that you want to calculate.
This equation can help you!
