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29 votes
29 votes
The value of a newly purchased computer will decrease over time. The value of the computer can be modeled by the following function:

f(t)=200+1,200(0.73)2t,

where t is measured in years since the computer was purchased.

Use the drop-down menus to complete the explanation of how the function models the computer's value over time.

The value of a newly purchased computer will decrease over time. The value of the-example-1
The value of a newly purchased computer will decrease over time. The value of the-example-1
The value of a newly purchased computer will decrease over time. The value of the-example-2
The value of a newly purchased computer will decrease over time. The value of the-example-3
The value of a newly purchased computer will decrease over time. The value of the-example-4
User IAMTubby
by
2.6k points

2 Answers

18 votes
18 votes

Answer:

1) 1,400

2) 0

3) 200

The value of a newly purchased computer will decrease over time. The value of the-example-1
User Spencer Cole
by
2.8k points
24 votes
24 votes

Answer:

  • $1400
  • 0
  • 200

Explanation:

a)

Substitute 0 for t and evaluate the expression. Recognize that any value to the zero power is 1.

f(0) = 200 +1200(0.73^(2·0)) = 200 +1200·1

f(0) = 1400

When t=0, the value of the computer is 1400 dollars.

__

b)

The exponential expression 1200(0.73^(2t)) has a horizontal asymptote of 0. It gets closer and closer to 0.

__

c)

The exponential term gets closer to 0, so the function value gets closer to ...

f(∞) ≈ 200 +0 ≈ 200

f(t) gets closer and closer to 200.

The value of a newly purchased computer will decrease over time. The value of the-example-1
User Yegor
by
2.7k points
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