# Equation of Exchange Definition

**Equation of Exchange Definition**Táº¡i

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## What Is the Equation of Exchange?

The equation of exchange is an economic identity that shows the relationship between money supply, the velocity of money, the price level, and an index of expenditures. English classical economist John Stuart Mill derived the equation of exchange, based on earlier ideas of David Hume. It says that the total amount of money that changes hands in the economy will always equal the total money value of the goods and services that change hands in the economy.Â

### Key Takeaways

- The equation of exchange is a mathematical expression of the quantity theory of money.
- In its basic form, the equation says that the total amount of money that changes hands in an economy equals the total money value of goods that change hands, or that nominal spending equals nominal income.
- The equation of exchange has been used to argue that inflation will be proportional to changes in the money supply and that total demand for money can be broken down into demand for use in transactions and demand to hold money for its liquidity.

## Understanding the Equation of Exchange

The original form of the equation is as follows:

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$\begin{array}{cc}& \mathrm{M\text{\xc2 \xc3\u2014 \xc2 V \xc2 = \xc2 P \xc2 \xc3\u2014 \xc2 T where: M = \xc2 the\xc2money\xc2supply,\xc2or\xc2average\xc2currency\xc2units\xc2in V = \xc2 the\xc2velocity\xc2of\xc2money,\xc2or\xc2the\xc2average\xc2number\xc2of P = the\xc2average\xc2price\xc2level\xc2of\xc2goods\xc2during\xc2the\xc2year}}\end{array}$begin{aligned}&M times V = P times T\&textbf{where:}\&begin{aligned}M= &text{the money supply, or average currency units in}\&text{circulation in a year}end{aligned}\&begin{aligned}V= &text{the velocity of money, or the average number of}\&text{times a currency unit changes hands per year}end{aligned}\&P=text{the average price level of goods during the year}\&T=text{an index of the real value of aggregate transactions}end{aligned}

â€‹MÂ Ã—Â VÂ =Â PÂ Ã—Â Twhere:M=Â â€‹theÂ moneyÂ supply,Â orÂ averageÂ currencyÂ unitsÂ inâ€‹V=Â â€‹theÂ velocityÂ ofÂ money,Â orÂ theÂ averageÂ numberÂ ofâ€‹P=theÂ averageÂ priceÂ levelÂ ofÂ goodsÂ duringÂ theÂ yearâ€‹ï»¿

M x V can then be interpreted as the average currency units in circulation in a year, multiplied by the average number of times each currency unit changes hands in that year, which is equal to the total amount of money spent in an economy in the year.

On the other side,* *P x T can be interpreted as* *the average price level of goods during the year multiplied by the real value of purchases in an economy during the year, which is equal to the total money spent on purchases in an economy in the year.

So the equation of exchange says that the total amount of money that changes hands in the economy will always equal the total money value of the goods and services that change hands in the economy.Â

Later economists restate the equation more commonly as:

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$\begin{array}{cc}& \mathrm{M\text{\xc2 \xc3\u2014 \xc2 V \xc2 = \xc2 P \xc2 \xc3\u2014 \xc2 Q where: Q \xc2 = \xc2 an\xc2index\xc2of\xc2real\xc2expenditures}}\end{array}$begin{aligned}&M times V = P times Q\&textbf{where:}\&Q = text{an index of real expenditures}\&P times Q = text{nominal gdp}end{aligned}

â€‹MÂ Ã—Â VÂ =Â PÂ Ã—Â Qwhere:QÂ =Â anÂ indexÂ ofÂ realÂ expendituresâ€‹ï»¿

So now the equation of exchange says that total nominal expenditures is always equal to total nominal income.

The equation of exchange has two primary uses. It represents the primary expression of the quantity theory of money, which relates changes in the money supply to changes in the overall level of prices. Additionally, solving the equation for M can serve as an indicator of the demand for money in a macroeconomic model.

## The Quantity Theory of Money

In the quantity theory of money, if the velocity of money and real output are assumed to be constant, in order to isolate the relationship between money supply and price level, then any change in the money supply will be reflected by a proportional change in the price level.Â

To show this, first solve for P:

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$\mathrm{P\text{\xc2 = \xc2 M \xc2 \xc3\u2014 \xc2 ( V Q )}}$P = M times left(frac{V}{Q}right)

PÂ =Â MÂ Ã—Â (QVâ€‹)ï»¿

And differentiate with respect to time:

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$\frac{\mathrm{d\mathrm{P\mathrm{dt\text{\xc2 = \xc2 d M d t}}}}}{}$frac{dP}{dt} = frac{dM}{dt}

dtdPâ€‹Â =Â dtdMâ€‹ï»¿

This means inflation will be proportional to any increase in the money supply. This then becomes the fundamental idea behind monetarism and the impetus for Milton Friedmanâ€™s dictum that, “Inflation is always and everywhere a monetary phenomenon.”

## Money Demand

Alternatively, the equation of exchange can be used to derive the total demand for money in an economy by solving for M:

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$\mathrm{M\text{\xc2 = \xc2 ( P \xc2 \xc3\u2014 \xc2 Q V )}}$M = left(frac{P times Q}{V}right)

MÂ =Â (VPÂ Ã—Â Qâ€‹)ï»¿

Assuming that money supply is equal to money demand (i.e., that financial markets are in equilibrium):

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${\mathrm{M\mathrm{D\text{\xc2 = \xc2 ( P \xc2 \xc3\u2014 \xc2 Q V )}}}}_{}$M_D = left(frac{P times Q}{V}right)

MDâ€‹Â =Â (VPÂ Ã—Â Qâ€‹)ï»¿

Or:

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${\mathrm{M\mathrm{D\text{\xc2 = \xc2 ( P \xc2 \xc3\u2014 \xc2 Q ) \xc2 \xc3\u2014 \xc2 ( 1 V )}}}}_{}$M_D = left(P times Qright) times left(frac{1}{V}right)

MDâ€‹Â =Â (PÂ Ã—Â Q)Â Ã—Â (V1â€‹)ï»¿

This means the demand for money is proportional to nominal income and the inverse of the velocity of money. Economists typically interpret the inverse of the velocity of money as the demand to hold cash balances, so this version of the equation of exchange shows that the demand for money in an economy is made up of demand for use in transactions, (P x Q), and liquidity demand, (1/V).

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