No. $42.30 is less than one percent of 5000.
No. If the rate is 7% a year, the interest is 350 a year. For 4 years, that is 1400. A LOT more than 42.30.
No. It is 5000*(1.07)^4 which is more than 36 times as large!
Compound int account
Principal:$2000
Rate2%
Time:7years
It is 6655.
Depends on how often and when the interest will be paid. typicalle once a year at the end of the year. In that case 5000 * (1.05^3) = 5788.12
4 time periods (eg 4 years if the 5% simple interest were added each year). In simple interest, the interest is added, but attracts no interest itself (that is compound interest) - only the original value attracts the interest: 5% of RM 25000 = RM 1250 added each time RM 30000 - RM 25000 = RM 5000 RM 5000 ÷ RM 1250 = 4 time periods
$214.68
six percent
Simple interest I=Prt = (5000)(0.07)(2) = $700.Compound interest: A=P(1+r)t = 5000(1.07)2 = 5000(1.1449) = $5,724.50;I=A-P = 5,724.50 - 5000 = $724.50
Simple interest I=Prt = (5000)(0.07)(2) = $700.Compound interest: A=P(1+r)t = 5000(1.07)2 = 5000(1.1449) = $5,724.50;I=A-P = 5,724.50 - 5000 = $724.50
50 x 7 x 2 ie 700 Simple Interest; 5000 x (1.07)2 - 5000 ie 724.50 Compound Interest
The savings interest is calculated as simple interest. (P*n*r)/100 where P is the principal, n is the number of years and r is the rate of interest. The principal considered for this is the minimum balance maintained in the account between the 10th and 30th of that calendar month. Let us say on the 4th you had Rs. 5000 and on 10th you had Rs. 7000, on 18th Rs. 6500 and on 27th Rs. 5000, the amount considered for interest for that month is Rs. 5000/- Interest for that month = 5000 * (1/12) * 3.5 / 100 = Rs. 14.58/-
Simple interest: 5000 + I = PTR/100 = 5000 + 5000 x 4 x 6/100 = 6200 Compound interest: = 5000 x 1.064 = 6312.38
Principal amount 5,000 Interest rate 9 percent per year = 0.09 Continuous compounding Number of years 7 Future value = P e^rt Future value = (5000) e^(0.09)(7) Amount after 7 years = $9,388.05
The formula to calculate the present amount including compound interest is A = P(1 + r/n)nt where P is the principal amount, r is the annual rate expressed as a decimal , t is the number of years, and n is number of times per year that interest is compounded. In the question, P = 5000, r = 0.07, t = 4, and n = 1 A = 5000(1 + 0.07)4 = 5000 x 1.074 = 5000 x 1.310796 = 6553.98
It is 6655.
It depends on the rate of interest. Right now (early 2014), a fairly typical rate of interest on a 5 year CD would be around 2% APR. At that interest rate you'd need to invest almost $4000 in order to have $5000 in twelve years. If by "make $5000" you meant "have $5000 more than I had to start with" rather than "have $5000 total", you'd need to invest $18640 today for your interest over twelve years to amount to $5000.
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.
Depends on how often and when the interest will be paid. typicalle once a year at the end of the year. In that case 5000 * (1.05^3) = 5788.12
4 time periods (eg 4 years if the 5% simple interest were added each year). In simple interest, the interest is added, but attracts no interest itself (that is compound interest) - only the original value attracts the interest: 5% of RM 25000 = RM 1250 added each time RM 30000 - RM 25000 = RM 5000 RM 5000 ÷ RM 1250 = 4 time periods