A small town started to track its population in the year 1950. Each year that passed, the town’s population increased by 44. The function f(n)=495+44n

represents the town population n years after 1950. What was the town’s population in 1950? What is the projected population in 2030?(1 point)
The town’s population in 1950 was
people. The projected population in 2030 is
people.

1 answer

To find the town’s population in 1950, we can evaluate the function \( f(n) = 495 + 44n \) at \( n = 0 \) (since 1950 is the starting year).

Population in 1950: \[ f(0) = 495 + 44(0) = 495 \]

Therefore, the town’s population in 1950 was 495 people.

Projected population in 2030: To find the population in 2030, we need to determine \( n \) for that year: \[ n = 2030 - 1950 = 80 \]

Now we can calculate the population for 2030: \[ f(80) = 495 + 44(80) = 495 + 3520 = 4015 \]

Therefore, the projected population in 2030 is 4015 people.

In summary:

The town’s population in 1950 was 495 people.
The projected population in 2030 is 4015 people.