Answer:
$866
Explanation:
The exponential expression to use is:
P(t) = P0e^kt
P0 is the initial population
P(t) is the population after time t;
k is the constant
If Audrey invested $620 in an account in the year 2000, then, P0 = 620
If the value of the account reached $700 in the year 2004, this means after 4 years P(t) is $700
Substitute t = 4 and P(t) = 700 into the expression above;
700 = 620e^4k
700/620 = e^4k
1.129 = e^4k
ln 1.129 = ln(e^4k)
0.1214 = 4k
k = 0.1214/4
k = 0.03034
To determine the value of the account, to the nearest dollar, in the year 2011, that is after 11 years
P(11) = 620e^11k
P(11) = 620e^11(0.03034)
P(11)= 620e^0.3337
P(11) = 620(1.3961)
P(11) = 865.597
Hence the value of the account in 2011 is $866 to the nearest dollars