Asked by Thara!
Heinz has been contributing $300 at the end of each month for the past 15 months to a sivings plan that earns 6% compounded monthly. What amount will he have 1 year from now if he continues the plan?
I'm not sure how to get the answer for this question which is:
$8649.11
I'm not sure how to get the answer for this question which is:
$8649.11
Answers
Answered by
tchrwill
Sn = D[(1+i)^n-1)/i where
Sn = the accumulated sum over n interest periods
D = the periodic deposit
i = the periodic interest paid = I%/100n
n = the number of interest bearing periods
The total interest beariing period is 15 + 12 months
The monthly interest is 6/100(12) = .005
The monthly deposit is $300
Therefore,
S(27)=300[(1.005)^27-1]/.005= $8,649.11
Sn = the accumulated sum over n interest periods
D = the periodic deposit
i = the periodic interest paid = I%/100n
n = the number of interest bearing periods
The total interest beariing period is 15 + 12 months
The monthly interest is 6/100(12) = .005
The monthly deposit is $300
Therefore,
S(27)=300[(1.005)^27-1]/.005= $8,649.11
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