7.2/12 = 0.6
get the difference of interest rate and monthly periodic payment
Let i = annual rate of interest. Then i' = ((1+i )^(1/12))-1 Where i' = monthly rate of interest
Multiply the monthly payment you are required to pay by the percentage interest you are paying. This will give you the amount of your loan each month that goes toward interest. Subtract this number from the total monthly payment for your amount of principle.
Amortization tables are used to help customers who have a loan see how the loan is progressing. An amortization table is normally used for mortgages. An amortization table can help you see how much of your monthly payment goes towards the principal of your loan. This type of table can also help you see how much of your monthly payment goes towards the interest that your loan accumulates.The Monthly Payment Column on an Amortization TableThe monthly payment column is the column that shows you how much money you have to pay every month. Most loans feature monthly payments that do not change throughout the length of your loan's term.The Principal Paid Column on an Amortization TableThe principal paid column on an amortization table is the column that tells you how much of your monthly payment goes towards the amount of money that you borrowed and now owe to the lender. At the start of your loan, your principal payments will be pretty small. You make small monthly payments at the beginning of your loan because there is more interest at the start of the loan. Once the amount of money that you owe gets smaller, more of your monthly payment will go to the principal.The Interest Column on an Amortization TableThe interest column shows you how much of your monthly payment is going to the interest that has accumulated on your loan. The amount of interest that is taken out of your monthly payment is higher because most of you owe has not been paid back yet. As your overall balance gets smaller, your monthly interest payments will decrease as well. You can figure out how much of your payment goes to interest by multiplying the interest rate by the loan's outstanding balance.The Balance Column on an Amortization TableThe balance column tells you how much of the loan you still need to pay to your lender. You can determine how much of your loan you still need to pay by subtracting your monthly principal payment from last month's balance.
how much interest will be paid for rs.1 lakh for 10 year perod at 10.5 pa as per emi scheme and as per monthly instalment scheme
Hey maybe don’t show the question if there isn’t an answer!
It depends on the terms and conditions etc of the type of savings account. Some savings accounts have interest calculated monthly (on daily balances), and credit the amount of interest to the account monthly. Others do an annual calculation of interest, also based on daily cleared balances, but only credit the account once a year. If interest is credited each month, each subsequent month you also get interest on the interest previously credited to the account. Alternately, if the interest is paid/credited only annually, the sum credited is the total interest for the year. Interest rates are quoted taking these factors into account. An account which credits interest monthly will always pay a slightly lower Gross rate of interest than an account that has an annual interest period. This is to take account of the fact that the return on an account where the balance is increasing monthly (due to interest being added each month) will always give a higher return in the year compared to an an account with the same Gross interest rate, but which is calculated and credited only once a year.
It varies, interest is typically paid monthly or quarterly depending on the type of account it is. Checking accounts ususally pay interest monthly while savings and certificates typically pay interest quarterly. It is up to the bank on how often they pay interest.
The answer depends on how frequently the interest is calculated. If it is calculated only at the start, then 1088.12.If it is calculated annually on the outstanding balance, then 827.88If it is calculated monthly on the outstanding balance, then 795.58
If you mean 5.8% annual interest rate compounded monthly, then (1000*.058)/12 = 4.83
"per diem" is Latin for "by days" Interest calculated "per diem" would be calculated every day, not monthly or yearly.
get the difference of interest rate and monthly periodic payment
Generally a personal checking account which earns intrest will credit the acct. Monthly
Yes, a high interest account is a very desirable savings account because you will gain a decent amount of interest on your money. You will gain much more money if you get compound interest by saving more money into the account monthly.
There is no single best interest calculator. At the same time, if you have a good standing with your bank, you should only be charged the calculated interest. Take a look at: ncalculators.com/interest/monthly-interest-calculator.htm
Simple interest is calculated on the principal amount only, which may sound like a good idea at first. The problem with simple interest loans is that the interest is calculated daily instead of monthly. This means you will end up paying more in interest with a simple interest loan.
Compounded daily means interest is calculated and added to the account balance every day, resulting in slightly higher overall returns compared to compounding monthly, where interest is calculated once at the end of each month. This difference is due to the more frequent compounding events in daily compounding.