Respuesta :
Answer:
a) We want to find [tex] p(3)[/tex] and if we replace x=3 into p(x) we got:
[tex] p(3) = 0.03*(3)^2 +0.42*3 +9.63 = 11.16[/tex]
b) We want to find [tex] p(13)[/tex] and if we replace x=13 into p(x) we got:
[tex] p(13) = 0.03*(13)^2 +0.42*13 +9.63 = 20.16[/tex]
c) [tex] p(13)-p(3) = [0.03*(13)^2 +0.42*13 +9.63]-[0.03*(3)^2 +0.42*3 +9.63] = 20.16-11.16 = 9[/tex]
d) [tex] \frac{p(13)-p(3)}{13-3}[/tex]
If we use the result from part c we have:
[tex] \frac{p(13)-p(3)}{13-3}= \frac{9}{10}= 0.9[/tex]
And the interpretation for this case would be:
It represents the average rate of change in price from 1996 to 2006.
Step-by-step explanation:
For this case we have the following function given:
[tex] p(x) = 0.03 x^2 +0.42 x +9.63[/tex]
Part a
We want to find [tex] p(3)[/tex] and if we replace x=3 into p(x) we got:
[tex] p(3) = 0.03*(3)^2 +0.42*3 +9.63 = 11.16[/tex]
Part b
We want to find [tex] p(13)[/tex] and if we replace x=13 into p(x) we got:
[tex] p(13) = 0.03*(13)^2 +0.42*13 +9.63 = 20.16[/tex]
Part c
For this case we want to find [tex] p(13) -p(3)[/tex] and we have from the results of part a and b this:
[tex] p(13)-p(3) = [0.03*(13)^2 +0.42*13 +9.63]-[0.03*(3)^2 +0.42*3 +9.63] = 20.16-11.16 = 9[/tex]
Part d
For this case we want to find:
[tex] \frac{p(13)-p(3)}{13-3}[/tex]
If we use the result from part c we have:
[tex] \frac{p(13)-p(3)}{13-3}= \frac{9}{10}= 0.9[/tex]
And the interpretation for this case would be:
It represents the average rate of change in price from 1996 to 2006.
