The amount deposited in CD is $660
Given that , To save for the purchase of a new car, a deposit was made into an account that earns 8% annual simple interest.
Let the amount deposited in new car be $ n
Another deposit, $1700 less than the first deposit, was placed in a certificate of deposit (CD) earning 12% annual simple interest.
Then, amount deposited in CD will be $ (n – 1700)
The total interest earned on both accounts for 1 year was $676
The simple interest is given as:
[tex]\text { Simple interest }=\frac{\text { principal } \times \text {rate} \times \text {time}}{100}[/tex]
Simple interest for purchase of new car:
[tex]\text { S. } \mathrm{I}=\frac{n \times 8 \times 1}{100}=\frac{8 n}{100}[/tex]
Simple interest for CD:
[tex]\text { S.I } =\frac{(n-1700) \times 12 \times 1}{100}=\frac{12(n-1700)}{100}[/tex]
Now, given that S.I for new car + S.I for CD = 676
[tex]\begin{array}{l}{\frac{8 n}{100}+\frac{12(n-1700)}{100}=676} \\\\ {\frac{8 n+12 n-12 \times 1700}{100}=676}\end{array}[/tex]
20n = 67600 – 20400
n = 2360
So money deposited in CD = n - 1700 = 2360 – 1700 = 660
Hence, the CD deposit amount is $660