Answer:
10.3 years
Step-by-step explanation:
(a) Use the compound amount equation: A = P(1 + rt), where, in this case,
P represents the original $1000 value and r is the rate of change.
Here, A = $1000(1 - 0.20)^2, or $1000(0.80)^2 = $640
the phone will be worth $640 after 2 years.
(b) "1/10 of its original price" would be (1/10)($1000) = $100.
Using the same equation:
$100 = $1000(0.80)^t
or:
1/10 = 0.80^t
Taking the natural log of both sides:
ln (1/10) = t ln 0.80, so that:
-ln 10
t = ------------- = -2.3025 / (-0.2231) = 10.3 years
ln 0.80
