The consumer price index compares the cost of goods and services over various years. The same goods and services that cost $100 in 1967 cost $148.50 in 1977. Assuming exponential growth, find the value of these same goods and services in 1999.

The cost of the goods and services is approximately $970.05 in the year 1999

Explanation:

In this question, we are asked to calculate the cost of a particular goods and services in the year 1999, which cost a certain amount in the year 1967 and 1997.

We proceed as follows;

$100 = base year (1967)

$148.50 in 1977, which is "Year 10" because 1977-1967 = 10

$? in 1999, which is "Year 32"

Exponential growth generally looks like:

y = Pe^rt where P = initial value, r = "rate," and t = time

We know the following ordered pairs:

(0, 100) and (10, 148.50)

Plugging them in ...

100 = Pe^r (0) = P so P = 100

Now let's do the same with the next ordered pair

148.50 = (100) (e^10r)

148.50/100 = e ^10r

1.485 = e^10r

ln (1.485) = 10r

0.1ln (1.485) = r

Now we plug that in for our r to get the formula

Y = (100) (e^ (0.1ln (1.485) t)

Now we plug in year 32 and solve for y

Y = (100) (e^ (0.1ln (1.485) t) =

Y = (100) (e^ 3.2ln (1.485)

Y = approx. $970.05 in 1999