Answer:
Annual compounding gives $177,582.70
Continuous compounding gives $ 177,994.97
Explanation:
In the first place, the balance on account can be computed using the future value formula given below:
FV=PV*(1+r)^N
FV is the future value which is unknown
PV is the amount invested at time zero which is $150,000
r is the rate of return on the investment at 2.76%
N is the period of investment which is 6.2 years
FV=$150,000*(1+2.76%)^6.2
FV=$ 177,582.70
However if the continuous compounding is opted for the accumulated value is computed thus:
FV=PV* e^(rs*N)
where e is constant figure given as 2.7182818
rs is the rate of return at 2.76%
N is 6.2 years
PV is $150,000
FV=$150,000*2.7182818^(2.76%*6.2)
FV=$150,000*1.186633134
FV=$ 177,994.97