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A heavy rope must be pulled onto the roof of a tall building. Each foot of rope weighs 3 pounds, and the rope is 20 feet long. At the start of the job, moving the rope by pulling it up requires 60 pounds of force. In the middle of the job, 10 feet of the rope is resting on the roof, and only 10 feet of rope must be lifted. Now, 30 pounds of force is required to move the second half of the rope by pulling it up. The force needed to pull the whole rope onto the roof is a variable force. Which equation r( x ) could describe the variable force needed to move the rope by pulling it up?
The variable x represents the feet of rope that have already been lifted on to the roof.
Note, r (x) also describes the weight of the portion of rope that must still be lifted, when x feet of rope have already been lifted on to the roof.
a. r(x) = 3x
b. r(x) = 20x
c. r(x) = 3 (20 – x)

Respuesta :

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Answer:

c. r(x) = 3 (20 – x)

Step-by-step explanation:

We are given that for x = 0, r(x) = 60 and for x = 10, r(x) = 30.

This is can be modeled as a linear equation with a negative slope (r(x) decreases as x increases). The numeric value of the slope is the weight of each foot of rope, which is 3 pounds. The equation can be written as:

[tex]r-r(0) = -3(x-x(0))\\r-60 = -3(x-0)\\r=60-3x\\r=3(20-x)[/tex]

Therefore, the answer is alternative c. r(x) = 3 (20 – x)

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