Answer:
The decay function is [tex]y(t)=a(1-r)^{t}[/tex]
The graph is attached down
The domain is {t: t ≥ 0}
The range is {y: y > 0}
The y-intercept represents the initial value of the couch
The value of the couch in 2014 is $781.25 to the nearest penny
Step-by-step explanation:
The form of the decreasing exponential function is [tex]y=a(1-r)^{x}[/tex], where
- a is the y-intercept ⇒ initial amount
- r is the rate of in decimal
- y is the dependent amount
- x is the independent amount
∵ The value of a couch is decreasing at a rate of 6.3% per year
∴ [tex]y(t)=a(1-r)^{t}[/tex]
∴ y represents the amount of money
∴ t represents the number of years
∴ r = 6.3% = 6.3/100 = 0.063
∵ In 2007, the couch was worth $1,232
∴ The initial value is $1,232
∴ a = 1,232
∵ We need to find the value of the couch in 2014
∴ t = 2014 - 2007 = 7 years
→ Substitute the values of a, r, and t in the function above
∵ The decay function is [tex]y(t)=1,232(1-0.063)^{t}[/tex]
∵ [tex]y(7)=1,232(1-0.063)^{7}[/tex]
∴ [tex]y(7)=1,232(0.937)^{7}[/tex]
∴ y(7) = 781.2460671
→ Round it to the nearest penny (2 d.p)
∴ y(7) = 781.25
∴ The value of the couch in 2014 is $781.25 to the nearest penny
∵ The y-intercept is the value of y at t = 0
∴ The y-intercept represents the initial value of the couch
→ The graph is attached down
→ The domain is {t: t ≥ 0}
→ The range is {y: y > 0}
