The rate of change in revenue for Under Armour from 2004 through 2009 can be modeled by dR /dt = 13.897t + 284.653 t where R is the revenue (in millions of dollars) and t is the time (in years), with t = 4 corresponding to 2004. In 2008, the revenue for Under Armour was $725.2 million.
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(a) Find a model for the revenue of Under Armour. (Round your constant term to two decimal places.) R(t) = 6.9485t2+284.653 ln(t)-311.42 Correct: Your answer is correct.
(b) Find Under Armour's revenue in 2009. (Round your answer to two decimal places.) $ million

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okpalawalter8 okpalawalter8 · Answer 1 · 2020-08-18T06:40:10+02:00

Answer:

The revenue is [tex]R(9) = \$ 876.9[/tex]

Step-by-step explanation:

From the question we are told that

The rate of change in revenue for Under Armour from 2004 through 2009 is

[tex]\frac{d R }{dt } = 13.897t + \frac{284.653}{t}[/tex]

Now

[tex]dR = (13.897t + \frac{284.653}{t})dt[/tex]

Integrating both sides to obtain R(t)

[tex]\int\limits dR = \int\limits (13.897t + \frac{284.653}{t})dt[/tex]

[tex]\int\limits dR = \int\limits (13.897\frac{t^2}{2} + 284.653(ln (t)) ) + C[/tex]

=> [tex]R(t) = 6.9485t^2 + 284.653(ln (t) ) + C[/tex]

From the question we have that at t = 8 [tex]R(8)= \$ 725.2 \ million[/tex]

[tex]725.2 = 6.9485(8)^2 + 284.653(ln (8) ) + C[/tex]

=> [tex]C = -311.4[/tex]

So

[tex]R(t) = 6.9485t^2 + 284.653(ln (t) ) -311.4[/tex]

At t = 9

[tex]R(9) = 6.9485*(9)^2 + 284.653(ln (9) ) -311.4[/tex]

[tex]R(9) = \$ 876.9[/tex]