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If compounded, interest = 81.244 and balance = 456.245 If not compounded, interest = 75 and balance = 450
The total value of the deposit will be $1248.929 at the end of 5 years. The year wise ending balance would be:918991.441070.7551156.4161248.929 This is under the assumption that the interest of 8% is compounded annually.
9.5% semi-annually = 19.9025% annually.After 10 years 1200*(1.199025)^10 = 7369.93
2500 * 1.06^3 = 2977.54
The question doesn't tell us the compounding interval ... i.e., how often theinterest is compounded. It does make a difference. Shorter intervals makethe account balance grow faster.We must assume that the interest is compounded annually ... once a year,at the end of the year.1,400 x (1.055)3 = 1,643.94 (rounded)at the end of the 3rd year.
If compounded, interest = 81.244 and balance = 456.245 If not compounded, interest = 75 and balance = 450
The total value of the deposit will be $1248.929 at the end of 5 years. The year wise ending balance would be:918991.441070.7551156.4161248.929 This is under the assumption that the interest of 8% is compounded annually.
1996.50
8 percent compounded quarterly is equivalent to approx 36% annually. At that rate, after 3 years the ending balance would be 1762.72 approx.
With compound interest - the balance after 7 years would be 26336.18
9.5% semi-annually = 19.9025% annually.After 10 years 1200*(1.199025)^10 = 7369.93
2500 * 1.06^3 = 2977.54
At the end of the first year, the balance in the account is: 5000(1+.0638). At the end of the second year, the balance in the account is: 5000(1+.0638)(1+.0638). At the end of the third year, the balance in the account is: 5000(1+.0638)(1+.0638)(1+.0638). At the end of the t year, the balance in the account is: 5000(1+.0638)^t. So, at the end of the tenth year, the balance in the account is 5000(1+.0638)^10 = 9,280.47. $5,000 is your principal, and the remaining ($9,280.47 - $5,000) = $4,280.47 is the interest.
The question doesn't tell us the compounding interval ... i.e., how often theinterest is compounded. It does make a difference. Shorter intervals makethe account balance grow faster.We must assume that the interest is compounded annually ... once a year,at the end of the year.1,400 x (1.055)3 = 1,643.94 (rounded)at the end of the 3rd year.
When a financial product pays compounded interest the investor earns interest on interest earned. For example, when $1,000 is invested at a compounded rate of 5 percent the principal balance of the investment would increase to $1,050 at the end of year one assuming annual compounding of interest. In year two the investor would receive interest at 5 percent on $1,050 for an interest payment of $52.50 in year two. Money left to accumulate at compounded interest can grow tremendously over time (see Compounded Earnings: Making Your Money Work for You).Banks offer compounded interest on savings accounts and certificates of deposit. Another method of obtaining a compounded rate of interest can be achieved by buying US Treasury issued zero coupon bonds which offer the advantage of long dated paper and the ability to know upfront what the compounded rate of return will be (see Zero Coupon Bonds Explained: Locking in Long Term Profits).
The final amount is $1,647.01
The answer depends on how the interest is compounded - but in simple interest compounded annually on $70,000 at 12 percent, the total value would be $383,150. The first year the investment would earn $8,400 ($70,000 x .12), and the "principle balance" would increase to $78,400. The second year interest would be earned on $78,400 ($70,000 + $8,400 earned in year one), which would be $9,408 ($78,400 x .12), making the new principle balance $87,808. Interest in the fifteenth year would be $41,052 paid on a principle balance of $342,098, for a total of $383,150.