Equated monthly installment: Difference between revisions
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{{short description|Loan repayment variant}} |
{{short description|Loan repayment variant}} |
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{{more citations needed|date=November 2021}} |
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{{Multiple issues| |
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| ⚫ | An '''equated monthly installment (EMI)''' is a fixed payment amount made by a borrower to a lender at a specified date each calendar month. Equated monthly installments are used to pay off both [[interest]] and [[principal sum|principal]] each month, so that over a specified number of years, the [[loan]] is fully paid off along with interest.<ref>{{cite web |url=https://www.investopedia.com/terms/e/equated_monthly_installment.asp |title=Equated Monthly Installment (EMI): How It Works, Formula, Examples |last=Kagan |first=Julia |publisher=Investopedia}}</ref> |
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{{unreferenced|date=September 2012}} |
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{{notability|date=September 2012}} |
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}} |
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| ⚫ | As with most common types of loans, such as real estate [[mortgages]], the borrower makes fixed periodic payments to the lender over the course of several years with the goal of retiring the loan. EMIs differ from variable payment plans, in which the borrower is able to pay higher payment amounts at his or her discretion. In EMI plans, borrowers are mostly only allowed one fixed payment amount each month. |
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| ⚫ | An '''equated monthly installment (EMI)''' is |
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==Formula== |
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The benefit of an EMI for borrowers is that they know precisely how much money they will need to pay toward their loan each month, making the [[personal budget]]ing process easier. |
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:<math>P \,=\,A\cdot\frac{1-\left({1+r}\right)^{-n} }{r}</math> |
:<math>P \,=\,A\cdot\frac{1-\left({1+r}\right)^{-n} }{r}</math> |
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:<math>A \,=\,P\cdot\frac{r(1 + r)^n}{(1 + r)^n - 1}</math> |
:<math>A \,=\,P\cdot\frac{r(1 + r)^n}{(1 + r)^n - 1}</math> |
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Where: ''P'' is the principal amount borrowed, ''A'' is the periodic [[amortizing loan|amortization]] payment, ''r'' is the annual interest rate divided by 100 (annual interest rate also divided by 12 in case of monthly installments), and ''n'' is the total number of payments (for a 30-year loan with monthly payments ''n'' = 30 × 12 = 360). |
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| ⚫ | For example, if you borrow 10,000,000 |
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'''The following will help to obtain EMI.''' |
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Present Value Splitter function. |
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PV is to be taken as $1. |
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For interest 6%. Period 240 months. |
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Splitter function. |
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Find Splitter function as: |
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1/((1+(0.06÷12)) =0.9950248756 |
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Bits Processor. |
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This Processor, helps to split $1 into 240 bits, adding 6% interest. This is obtained in 2 steps. |
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The bits processor is our Geometric Sequence Calculator. |
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fill splitter function as initial term. |
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fill common ratio as the same splitter function. |
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fill 240 as n. |
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the sum of n terms is to be taken into the step 1 of the following. |
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Step 1: Find the Sum of n terms of by filling the GP calculator as above: the value is 139.5808 |
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| ⚫ | For example, if you borrow $10,000,000 from the bank at 10.5% annual interest for a period of 10 years (i.e., 120 months), then EMI = $10,000,000 × 0.00875 × (1 + 0.00875)<sup>120</sup>/((1 + 0.00875)<sup>120</sup> – 1) = $134,935. i.e., you will have to pay $134,935 for 120 months to repay the entire loan amount. The total amount payable will be $134,935 × 120 = $16,192,200 that includes $6,192,200 as interest toward the loan. |
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Step 2. |
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The bits value.(for 240 months) |
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1/ 139.5808= 0.0071643091 |
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Now we can present , |
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The 240 bits value of PV =$1, at 6% interest is 0.0071643091. |
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When PV is,$1,00,000, the bits value is $716.43091 (240 numbers) |
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In other words, |
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Loan of $1,00,000, at 6% interest , period 240 months , EMI is $716.43 |
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==References== |
==References== |
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[[Category:Loans]] |
[[Category:Loans]] |
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[https://emicalculator.io EMI Calculator] |
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Latest revision as of 12:54, 4 December 2024
 | This article needs additional citations for verification. (November 2021) |
An equated monthly installment (EMI) is a fixed payment amount made by a borrower to a lender at a specified date each calendar month. Equated monthly installments are used to pay off both interest and principal each month, so that over a specified number of years, the loan is fully paid off along with interest.[1]
As with most common types of loans, such as real estate mortgages, the borrower makes fixed periodic payments to the lender over the course of several years with the goal of retiring the loan. EMIs differ from variable payment plans, in which the borrower is able to pay higher payment amounts at his or her discretion. In EMI plans, borrowers are mostly only allowed one fixed payment amount each month.
Formula
[edit]The formula for EMI (in arrears) is:[2]
or, equivalently,
Where: P is the principal amount borrowed, A is the periodic amortization payment, r is the annual interest rate divided by 100 (annual interest rate also divided by 12 in case of monthly installments), and n is the total number of payments (for a 30-year loan with monthly payments n = 30 × 12 = 360).
For example, if you borrow $10,000,000 from the bank at 10.5% annual interest for a period of 10 years (i.e., 120 months), then EMI = $10,000,000 × 0.00875 × (1 + 0.00875)120/((1 + 0.00875)120 – 1) = $134,935. i.e., you will have to pay $134,935 for 120 months to repay the entire loan amount. The total amount payable will be $134,935 × 120 = $16,192,200 that includes $6,192,200 as interest toward the loan.
References
[edit]- ^ Kagan, Julia. "Equated Monthly Installment (EMI): How It Works, Formula, Examples". Investopedia.
- ^ "Calculating EMIs".
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