Answer:
When new, the scooter cost $900
Step-by-step explanation:
The complete question in the attached figure
we have
[tex]A(t)=900(0.85)^t[/tex]
This is a exponential function of the form
[tex]A(t)=a(b)^t[/tex]
where
A(t) ----> represent the value of a motor scooter
t ----> the number of years after it was purchased
a ---> represent the initial value or y-intercept
b is the base of the exponential function
r is the percent rate of change
b=(1+r)
In this problem we have
[tex]a=\$900\\b=0.85[/tex]
The base b is less than 1
That means ----> is a exponential decay function (is a decreasing function)
Find the percent rate of change
[tex]b=(1+r)\\0.85=1+r\\r=0.85-1\\r=-0.15[/tex]
Convert to percentage (multiply by 100)
[tex]r=-15\%[/tex] ---> negative means is a decreasing function
Verify each statements
case A) When new, the scooter cost $765.
The statement is false
Because the original value of the scooter was $900
case B) When new, the scooter cost $900
The statement is true (see the explanation)
case C) The scooter’s value is decreasing at a rate of 85% each year
The statement is false
Because the scooter’s value is decreasing at a rate of 15% each year (see the explanation)
case D) The scooter’s value is decreasing at a rate of 0.15% each year
The statement is false
Because the scooter’s value is decreasing at a rate of 15% each year (see the explanation)
