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PLEASE HELP WILL AWARD BRAINLIEST!! A company makes chairs, loungers, and footstools. Each item uses units of wood, fabric, and stuffing. Chairs use 30 units of wood, 30 units of fabric, and 10 units of stuffing. Loungers use 25 units of wood, 15 units of fabric, and 10 units of stuffing. Footstools use 20 units of wood, 5 units of fabric, and 5 units of stuffing. There are 1,380 units of wood, 890 units of fabric, and 450 units of stuffing available to make the items. Which three equations are needed to find the largest number of x chairs, y loungers, and z footstools that can be made? Drag and drop the correct equations into the box.

Respuesta :

samuelonum1

Answer:

30x+25y+20z=1380

30x+15y+5z=890

10x+10y+5z=450

Step-by-step explanation:

in this problem we are expected to formulate the constraints

let chairs, loungers and footstools be x, y and z respectively

1. For wood we have

30x+25y+20z=1380

2 . For fabric we have

30x+15y+5z=890

. For stuffing we have

10x+10y+5z=450

therefore the three equation are

30x+25y+20z=1380

30x+15y+5z=890

10x+10y+5z=450

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