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The weight of Jacob’s backpack is made up of the weight of the contents of the backpack as well as the weight of the backpack itself. Seventy percent of the total weight is textbooks. His notebooks weigh a total of 4 pounds, and the backpack itself weighs 2 pounds. If the backpack contains only textbooks and notebooks, which equation can be used to determine t, the weight of the textbooks?

Respuesta :

If the backpack (b) contains only textbooks (t) and notebooks (n), the total weight of the backpack is:

b+t+n

but notebooks are 4 pounds, so actually:

b+t+4

also, the backpack weights 2 pounds, so the total weight is:

2+t+4 =t+6
 now, "Seventy percent of the total weight is textbooks. ", this means that


t=70%(t+6) - this equation can be used to determine the weight of the textbooks!
 

The equation that can be used to determine t, the weight of the textbooks will be 0.3t = 4.8

How to compute the equation?

From the information, seventy percent of the total weight is textbooks. This means they 30% are notebooks.

The equation can be used to determine t, the weight of the textbooks will be:

0.7(t) + (0.3)(4) = 4 + 2 + t

0.7t + 1.2 = 6 + t

t - 0.7t = 6 - 1.2

0.3t = 4.8

Learn more about equations on:

brainly.com/question/2972832

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