Equated Monthly Installment (EMI) (2024)

The fixed monthly payments that borrowers make to lenders to pay down their loans

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Written byCFI Team

Summary

Equated monthly installments (EMIs) are the fixed monthly payments that borrowers make to lenders to pay down their loans.
Each EMI is composed of an interest and a principal component, with each amount determined based on the outstanding loan principal, term, and interest rate.
The reducing-balance EMI calculates interest based on the remaining loan outstanding, which leads to shrinking interest payments over time.
The flat-rate EMI calculates interest payments based on the original loan amount, despite the reducing balance outstanding, which leads to a higher total interest payment than the reducing-balance EMI.

Understanding Equated Monthly Installments

Borrowers usually make equated monthly installments (EMIs) for many types of loans, such as student loans, auto loans, and home mortgages. EMIs are made on the same day every month at a fixed amount. The borrower will be able to completely pay off the loan at the end of the loan term if EMIs are made as scheduled.

Compared to variable payment plans, which allow borrowers to make payments at their discretion based on their periodic incomes, EMIs have a clear repayment schedule and term to maturity.

EMIs consist of contributions of both interest and principal, but the composition of each EMI changes over time, and, at the end of the loan term, the loan will be paid down completely.

Calculation of EMI

The calculation of EMI requires three inputs: the total principal amount, interest rate, and term of the loan. There are two methods to calculate EMI: the flat-rate method and the reduce-balancing method.

1. Flat-Rate Method

In the flat-rate method, each interest charge is calculated based on the original loan amount, even though the loan balance outstanding is gradually being paid down. The EMI amount is calculated by adding the total principal of the loan and the total interest on the principal together, then dividing the sum by the number of EMI payments, which is the number of months during the loan term.

For example, a borrower takes a $100,000 loan with a 6% annual interest rate for three years. The total amount of interest during the loan term will be $18,000 (6% * $100,000 * 3), which will be $500 monthly. The EMI amount will be $3,278 [($100,000 + $18,000) / 36]. Thus, the contribution to the principal of each EMI will be $2,778 ($3,278 – $500), which makes up 85% of each EMI, as the interest payment makes up the rest of 15%.

The flat-rate method is particularly used on personal loans and vehicle loans. It is less favorable to borrowers since the interest payments must be made for the entire principal amount, which leads to a higher effective interest rate compared to the reducing-balance method.

2. Reducing-Balance Method

In contrast to the flat-rate method, the reducing-balance method calculates the interest payment based on the principal outstanding. It means the interest and principal repayment portions of each EMI change overtime. At the early stage of the loan term, interest payment makes up a greater portion of the EMI, as a certain percentage of the loan outstanding.

As the loan is gradually repaid over time, the interest amount reduces, and a greater proportion of the contributions are made towards principal repayments. The reducing-balance method is commonly used on housing mortgages, credit cards, and overdraft facilities.

The reducing-balance EMI can be calculated through the formula below:

Where:

A = Periodic EMI amount
P = Principal borrowed
r = Periodic interest rate (annual interest rate/12)
n = Total number of payment (number of months during the loan tenure)

In the reducing-balance method, the EMI payment of the example above will change to $3,040, calculated as below:

The contribution to interest for the first EMI payment is $500 ($100,000 * 0.5%), and the principal repayment is thus $2,542 ($3,042 – $500). For the second month, the interest repayment reduces to $487 [($100,000 – $2,542) * 0.5%], and the principal repayment thus increases to $2,555. The rest of the payments can be calculated with the same method. The repayment schedule is shown in the table below:

As the diagram below shows, the interest portion declines gradually with the loan outstanding, which will be completely paid out and reduced to zero at the 36^thmonth. Here, the total amount of interest payment is $9,519, which is much lower compared to the $18,000 under the flat-rate method. It makes the reducing-balance method more favorable to borrowers.

FAQs

What is the formula for equated monthly installment EMI? ›

EMI = [P x R x (1+R)^N]/[(1+R)^N-1]. So to get a comprehensive understanding of these variables, let's discuss them in detail: R represents 'rate of interest'. It is the interest rate that a lending institution charges for a loan.

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How to calculate EMI easily? ›

EMI Calculation Methods

Calculating EMI has a Simple Formula, Which is as Follows: EMI = (P X R/12) X [(1+R/12) ^N] / [(1+R/12) ^N-1]. Here, P is the original loan amount or principal, R is the rate of interest that is applicable per annum and N is the number of monthly installments/ loan tenure.

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Does EMI stand for equal monthly installments? ›

What does EMI stand for? In the finance world, EMI stands for equated monthly installment. It refers to periodic payments made to settle an outstanding loan within a stipulated time frame. As the name suggests, these payments are the same amount each time.

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Is EMI good or bad? ›

Building Credit Score: Timely payment of EMIs contributes positively to an individual's credit score. This can be beneficial for future financial endeavors, such as securing loans for significant purchases like a home or a car. Responsible use of EMI reflects well on an individual's creditworthiness.

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How to calculate the monthly installment? ›

The equation to find the monthly payment for an installment loan is called the Equal Monthly Installment (EMI) formula. It is defined by the equation Monthly Payment = P (r(1+r)^n)/((1+r)^n-1). The other methods listed also use EMI to calculate the monthly payment. r: Interest rate.

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How to find equal monthly installments? ›

The EMI amount is calculated by adding the total principal of the loan and the total interest on the principal together, then dividing the sum by the number of EMI payments, which is the number of months during the loan term.

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What is the formula for calculating interest rate of EMI? ›

The mathematical formula for calculating EMIs is: EMI = [P x R x (1+R)^N]/[(1+R)^N-1], where P stands for the loan amount or principal, R is the interest rate per month [if the interest rate per annum is 11%, then the rate of interest will be 11/(12 x 100)], and N is the number of monthly instalments.

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What is the formula for the monthly payment? ›

Monthly Payment = (P × r) ∕ n

Again, “P” represents your principal amount, and “r” is your APR. However, “n” in this equation is the number of payments you'll make over a year. Now for an example. Let's say you get an interest-only personal loan for $10,000 with an APR of 3.5% and a 60-month repayment term.

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What is the formula for EMI on home? ›

The formula to calculate EMI is P x R x (1+R)^N / [(1+R)^N-1] – where, “P” is the principal loan amount, “N” in tenure in months, and “R” is the prevailing interest rate.

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How to calculate equated monthly installments in Excel? ›

Calculating EMIs with the formula

To calculate EMIs and interest for Personal Loans using Excel, input the loan amount, annual interest rate and loan tenure into separate cells. Then, use the formula =PMT(B2/12, B3, B1) in the EMI cell where B2 is the interest rate, B3 is the tenure and B1 is the loan amount.

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How to calculate monthly payment on a loan? ›

The formula is: M = P [ i(1 + i)^n ] / [ (1 + i)^n – 1], where M is the monthly payment, P is the loan amount, i is the interest rate (divided by 12) and n is the number of monthly payments.

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How to calculate monthly installment based on interest rate? ›

How to Calculate Monthly Loan Payments

If your rate is 5.5%, divide 0.055 by 12 to calculate your monthly interest rate. ...
Calculate the repayment term in months. ...
Calculate the interest over the life of the loan. ...
Divide the loan amount by the interest over the life of the loan to calculate your monthly payment.

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What is the disadvantage of EMI? ›

Longer Debts: The borrowers have to pay the monthly installments or EMIs until they are done with the principal amount and the applicable interest rate. In terms of home loans or personal loan these tenures go as long as 20 to 30 years.

Is EMI better than loan? ›

EMI is inherently neither good nor bad. EMI provides you with the convenience of repaying the loan in comfortable and easy installments. However, you cannot ignore the fact that through EMIs, you are actually paying more than you borrowed. The costs such as interest and processing fees are added to it.