Since the bank is paying compound interest , we have to use the formula for compound interest for calculating the amount.
The formula is,
`A_t=P(1+r/n)^(nt)`
where ,
`A_t` is the amount at the end of t years of investment
P is the principal
r is the annual rate of interest,
n is the number of compounding periods per year
Case 1
Given P=$100, t= 6 years , n=1 as interest is compounded annually, r=2%
Now plug in the given values in the formula to calculate the amount at the end of 6 years of investment,
So, `A_6=100(1+2/100)^6`
`A_6=100(1+1/50)^6`
`=100(51/50)^6`
`=100(1.02)^6`
`=112.6162419`
`~~112.62`
Case 2
Given: P=$100 , r=1.8% , n=4 ( as interest is compounded quarterly ) , t=6 years
Now plug the given values in the formula to calculate the amount at the end of 6 years,
`A_6=100(1+1.8/(4*100))^(4*6)`
`=100(1.0045)^24`
`=111.3777874`
`~~111.38`
So the first option is better with annual rate of interest 2% compounded annually, as the amount received after 6 years of investment is more than the second option.
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