Answer:
It will take approximately 34.13 years
Step-by-step explanation:
The function G(t) below represents the amount of money in some account t years after the account is opened for The Johnson's daughter Gabriella:
[tex]G(t)= 63,000(1+ .0255/4)^ {4t}[/tex]
It's required to find the number of years (t) it will take for the account to reach G(t)=150,000. We need to solve the equation:
[tex]63,000(1+ .0255/4)^ {4t}=150,000[/tex]
Dividing by 63,000 and simplifying:
[tex]\displaystyle (1+ .0255/4)^ {4t}=\frac{150,000}{63,000}=2.38095[/tex]
Taking logarithms:
[tex]\displaystyle \log(1+ .0255/4)^ {4t}=\log 2.38095[/tex]
Applying logarithms property:
[tex]\displaystyle (4t) \log(1+ .0255/4)=\log 2.38095[/tex]
Solving for t:
[tex]\displaystyle 4t =\frac{\log 2.38095}{\log(1+ .0255/4)}[/tex]
[tex]\displaystyle t =\frac{\log 2.38095}{4\log(1+ .0255/4)}[/tex]
Calculating:
[tex]\displaystyle t =\frac{0.37675}{0.01104}[/tex]
[tex]\boxed{t \approx 34.13}[/tex]
It will take approximately 34.13 years
