The gross national product (GNP) of a certain country was N(t)= (t)^2+5t+106 billion dollars, t years after 2000. At what rate was GNP changing with respect to time in 2008?

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deboada35 deboada35 · Answer 1 · 2018-11-08T16:07:11+01:00

1)you must DERIVE THE FUNCTION t^2 + 5t +106, it represents the variation , dy/dt = 2t+5

now , substitute it value in the equation

N(8) = 2(8)+5 = 21

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joaobezerra joaobezerra · Answer 2 · 2020-04-22T03:10:20+02:00

Answer:

In 2008, the GNP was changing at the rate of 21 billions of dollars per year in 2008.

Step-by-step explanation:

The GNP of a country is given by the following function:

[tex]N(t) = t^{2} + 5t + 106[/tex]

In which N(t) is calculated in billions of dollars.

The rate of change of the GNP after t years is:

[tex]N'(t) = 2t + 5[/tex]

Calculated in billions of dollars per year.

At what rate was GNP changing with respect to time in 2008?

2008 is 2008-2000 = 8 years after 2000. So this is N'(8).

[tex]N'(t) = 2t + 5[/tex]

[tex]N'(8) = 2*8 + 5[/tex]

[tex]N'(8) = 21[/tex]

In 2008, the GNP was changing at the rate of 21 billions of dollars per year in 2008.