The function f determines the cost (in dollars) of a new Honda Accord in terms of the number of years t since 2000. That is, f ( t ) represents the cost (in dollars) of a new Honda Accord t years after 2000. Use function notation to represent each of the following. The cost (in dollars) of a new Accord in 2006?
A. How much more a new Accord costs in 2013 as compared to the cost of a new Accord in 2010?
B. A new Accord in 2013 is how many times as expensive as a new Accord in 2010?
C. $980 dollars more than the cost of a new Accord in 2016.

The function f determines the cost (in dollars) of a new Honda Accord in terms of the number of years t since 2000. That is, f ( t ) represents the cost (in dollars) of a new Honda Accord t years after 2000. Use function notation to represent each of the following. The cost (in dollars) of a new Accord in 2006?

A. How much more a new Accord costs in 2013 as compared to the cost of a new Accord in 2010?

B. A new Accord in 2013 is how many times as expensive as a new Accord in 2010?

C. In 2016 , some cars cost $980 more than the cost of a new Accord.How much does the other cars cost (in dollars)in 2016?

Answer:

a

The cost of a new Accord in 2013 compared to 2010 is z = f(13) - f(10)

b

The magnitude at which the cost of a new Accord in 2013 is greater than the cost in 2010 is

[tex]x = \frac{f(13)}{f(10)}[/tex]

c

The cost of the other cars is 2016 is r = 980 + f(16)

Step-by-step explanation:

From the question we are told that

The cost (in dollars) of a new Honda Accord is f(t)

Where t is number of years after 2000

The cost of the Honda Accord at 2013 is

f(2013 - 2000) = f(13)

The cost of the Honda Accord at 2010 is

f(2010 - 2000) = f(10)

So the cost difference between 2013 and 2010 is mathematically evaluated as

z = f(13) - f(10)

Let constant at which the cost of Honda Accord in 2013 is greater than its cost at 2010 be x

So

f(13) = x f(10)

=> [tex]x = \frac{f(13)}{f(10)}[/tex]

The cost of the Honda Accord in 2016 is mathematically evaluated as

f(2016 - 2000) = f(16)

Now the cost of these other cars is mathematically evaluated as

r = 980 + f(16)

ahirohit963 ahirohit963 · Answer 2 · 2021-11-17T11:48:02+01:00

The difference between the cost of Accord in 2013 and 2010 is [z = f(13) - f(10)] and this can be determined by using the given data.

Given :

f(t) represents the cost (in dollars) of a new Honda Accord t years after 2000.

A). The cost of Accord in 2013 is given by:

[tex]f(2013-2000) = f(13)[/tex]

The cost of Accord in 2010 is given by:

[tex]f(2010-2000) = f(10)[/tex]

So, the difference between the cost of Accord in 2013 and 2010 is:

z = f(13) - f(10)

B). Let the constant be 'a' then the value of 'a' is:

[tex]a = \dfrac{f(13)}{f(10)}[/tex]

So, the new Accord in 2013 'a' times as expensive as a new Accord in 2010.

C). Cost of the Honda Accord in 2016 is:

[tex]f(2016-2000) = f(16)[/tex]

The cost of the other cars is:

r = 980 + f(16)

For more information, refer to the link given below:

https://brainly.com/question/14210034