Inverse Relationship | Inverse Relationships in Economics, Finance, Math (2024)

Definition of Inverse Relationship

Inverse relationship is a type of correlation that exists between two variables wherein an increase in one variable is associated with a decrease in another variable.

In other words, an inverse relationship, also known as a negative relationship, is a contrary correlation between two variables such that they move in opposite directions.

For example, we have two variables X and Y. As X increases, Y decreases and as Y increases, X decreases.

In statistics, an inverse relationship or correlation is denoted by the correlation coefficient “r” having a value between -1 and 0, with r= -1 indicating perfect inverse correlation.

Another common example of this type of relationship is between interest rates and consumer spending.

When the interest rates increase, consumers are less willing to spend and more willing to save. In addition, when unemployment increases, consumer spending decreases because people have less disposable income.

Definition of Correlation

Correlation is a statistic that measures the degree to which two variables move in relation to each other. It shows the strength of a relationship between two variables and is expressed numerically by the correlation coefficient (r).

Inverse Correlation Graph

Two sets of data points can be plotted on a graph on an x and y-axis to check for correlation. This is called a scatter diagram, which represents a visual way to check for a positive or negative correlation.

The graph below shows a strong negative relationship between two sets of data points plotted on the graph.

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Example of Calculating Inverse Correlation

Correlation can be calculated between two sets of data to arrive at a numerical result. The resulting statistic is used in a predictive manner to estimate metrics like the risk reduction benefits of portfolio diversification and other important data.

The example presented below shows how to calculate the statistic.

Assume an analyst needs to calculate the degree of correlation between the following two data sets:

X: 10, 8, 7, 5, 3
Y: 2, 5, 6, 8, 9

There are three steps involved in finding the correlation. First, add up all the X values to find SUM(X), add up all the Y values to find SUM(Y) and multiply each X value with its corresponding Y value and sum them to find SUM(X,Y):

SUM(X) = 10 + 8 + 7 + 5 + 3

= 33

SUM(Y) = 2 + 5 + 6 + 8 + 9

= 30

SUM(X,Y) = (10X2) + (8X5) + (7×6) + (5X8) + (3X9)

= 169

Inverse Relationships in Economics

There are many instances of inverse relationships in economics.

The one most commonly encountered is the price-demand relationship, where quantity demandedfalls (rises) aspriceincreases (decreases). This relationship is widely known asthe law of demand.

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The demand curve shows thequantity demandedof a product at different price levels.

Kindly note thatdemandis not the same thing asquantity demanded.

Demand for a good depends on many factors such as the price of the good and that of other goods, the level of income and wealth, individual preferences, etc. The demand curve above shows the quantities of the good demanded at different price levels when the other factors are held constant.

The inverse correlation between the price of the good and its quantity demanded depends on two factors:

Reduction in price. It means more goods can be purchased for the same expenditure as before.
Lower price of one product increasesrealincome, since less money is needed to purchase the product, even thoughmoney income remains the same. An increase in real income means that more of all goods, including the ones whose price has been reduced, can be purchased.

By contrast, the supply curve illustrates a direct relationship.

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When prices go up, existing suppliers will try to sell more, while new suppliers will be encouraged to enter the market. As a result, the quantity supplied of the product will increase as prices rise.

Inverse Relationships in Finance

There is an inverse relationship between interest rates and bond prices.

A bond is a fixed income financial instrument. Thus, bond prices fall as interest rates go up and rise as interest rates go down.

When a bond is issued, its face value, which is the amount of money, usually $1,000, the bond was issued to raise, is set. In addition, the bond will carry a coupon rate, which determines the fixed coupon payment. Thus a 10% coupon rate means that the $1,000 bond will pay $100 annually.

If a $1,000 bond of similar risk is issued that has a coupon rate of 12%, the 10% bonds will fall in value, because they pay only $100 annually, while the new bonds are paying $120. The price of the old bonds will fall until their $100 per annum payout equals 12%, i.e., $100/0.12 = $833.33.

Inverse Relationships in Math

In math, we often come across pairs of variables that are linked in some way.

For example, a data set shows: {(-6, -7) (-4, -3) (1, 5) (3, 7)},

where the values that occur first represent one variable and the values in the second position represent another variable.

In many cases, the values representing the first variable may be represented as the X-values and those representing the second variable, as Y-values.

The connection between the two variables may depend on some causal relationship or they may have been paired randomly. Regardless, by virtue of being paired, theXandYvalues in each pair, and by extension, the two variables which they represent are now in a relationship.

That relationship may be described by a rule that takes the values of thefirstvariable (X-values) and tells us the corresponding values of thesecondvariable (Y-values).

Just as reasonably, the relationship may be described by a rule that takes the values of thesecondvariable (Y-values) and tells us the corresponding values of thefirstvariable (X-values). Such rules in mathematics are known asfunctions.

A mathematical function is simply a rule that describes the relationship between ordered pairs, going either from X-values to Y-values, in which case it is written Y = f(X) or from Y-values to X-values and written X = f(Y) or Y = f^-1(X).

The set of values of the variable in brackets is called thedomain, while the set of values of the other variable is known as therange. Thus, in Y = f(X), the X-values are the domain, while the Y-values are the range.

Sometimes, a function is described as a machine that takes an input – the X-values – and delivers output – the Y-values.

As with any rule, its outcome must be definite. It means a rule should give the same result today and tomorrow. Accordingly, in f = (X), any X-value must result in only one Y-value and all X-values must have a result.

Hence, for any set of ordered pairs, there will be two rules, with one being theinverseof the other, i.e., the second rule would have described a function that is the inverse of the first rule. And the second function would bear an inverse relationship to the first function.

Inverse as Opposite of Direct Relationship

However, an inverse relationship may also exist between the X and Y variables rather than the functions. In such cases, an inverse relationship is the opposite of a direct relationship, where in Y = f(X), Y increases as X increases or in X = f(Y), X increases as Y increases.

In an inverse relationship, given by Y = f(X), Y would decrease as X increases.

More Examples of Inverse Relationship

There are many real-life examples of inverse relationships.

Travel speed and travel time. The faster one travels from point A to point B; the less travel time is required to arrive at point B from point A.
Current and resistance. The higher the resistance, the lower the current.
Savings and disposable income. The less disposable income, the more savings.
Government spending and unemployment rate. The higher the government spending, the lower the unemployment rate.
Unemployment rate and inflation, also known as the Phillips Curve.

The Phillips Curve is the most common example of an inverse relationship.

It is an economic concept developed by A.W. Phillips stating that inflation and unemployment rate have a stable and inverse relationship. The theory claims that with economic growth comes inflation, which in turn should lead to more jobs and less unemployment.

In reality, when government spending increases, the unemployment rate decreases because more jobs are created. Following higher government spending, employees are better compensated, which means that they have more money to spend.

On the other hand, firms face higher compensation costs, which are passed to consumers through inflation. Hence, the lower the unemployment rate, the higher the inflation.

Brief Summary About Phillips Curve

Since the Phillips curves suggests there is an inverse relationship between inflation and unemployment, policymakers then have an option on what to prioritize between the two.

During the 1950s and 1960s, Phillips curve analysis suggested there was a trade-off, and policymakers could use demand management (fiscal and monetary policy) to try and impact the rate of economic growth and inflation. This means, that if unemployment was high and inflation low, policymakers could stimulate aggregate demand. This would aid to reduce unemployment, but cause a higher rate of inflation.

In the 1970s however, there seemed to be a breakdown in the Phillips curve when stagflation (higher unemployment and higher inflation) occurred. The Phillips Curve was then criticized by monetarist economists who argued there was no trade-off between unemployment and inflation in the long run.

Regardless, some feel that the Phillips Curve still has some relevance and policymakers still need to consider the potential trade-off between unemployment and inflation.

Relevance of Phillips Curve Today

In the current economic climate, many Central Banks and policymakers are weighing up how much importance they should give to reducing unemployment and inflation. For example, the Federal Reserve is considering using monetary policy to achieve an unemployment target and a willingness to accept higher inflation.

During 2009-13, the Bank of England has been willing to tolerate inflation above the government’s target of 2% because they feel to reduce inflation would have caused serious problems for unemployment and economic growth.

This willingness to consider a higher inflation rate, suggest policymakers feel that the trade-off of higher inflation is worth the benefit of lower unemployment. However, not all economists agree we should be allowing the inflation target to increase.

If we allow inflation to increase, inflationary pressures will become engrained, and monetary policy will lose credibility.

What Does Inverse Correlation Tell You?

Inverse correlation tells you that when one variable increases, the other tends to decrease.

Two points need to be kept in mind with regard to inverse or negative correlation:

First, the existence of a negative correlation, or positive correlation for that matter, does not necessarily imply an underlying relationship.

Second, the relationship between two variables is not static and fluctuates over time. It means the variables may show an inverse correlation during some periods and a positive correlation during others.

Limitations of Using Inverse Correlation

Correlation analysis can tell useful information about the relationship between two variables, such as how the stock and bond markets often move in opposite directions. However, the analysis does not fully consider outliers or unusual behavior of a few data points within a given set of data points, which could twist the outcomes.

Similarly, when two variables show an inverse correlation, there might be some other variables that, while not part of the study, do affect the variable in question. Even though two variables have a very strong inverse correlation, this result never implies a cause and effect relationship between the two.

Finally, using the results of correlation analysis to infer the same conclusion to new data carries a high degree of risk.

FAQs

1. What is an inverse relationship?

An inverse relationship is a situation where if one variable increases, the other tends to decrease. In other words, when A increases, B tends to decrease.

2. What is an example of an inverse relationship?

An example of an inverse relationship is the relationship between bond prices and interest rates. An increase in interest rates typically causes a decrease in bond prices, while a decline in interest rates tends to cause an increase in bond prices.

3. What is the opposite of an inverse relationship?

The opposite of an inverse relationship is known as a direct relationship. A direct relationship exists when there is an increase in one variable that causes an increase in the other variable.

4. What is the difference between a direct and an inverse relationship?

A direct relationship, as opposed to an inverse relationship, exists when there is a positive correlation between two variables. In other words, if one variable increases then the other variable increases as well.

In contrast, in an inverse relationship one variable decreases as the other increases. In essence, one variable causes the opposite reaction of the other.

5. Are inverse relationship and negative correlation the same?

While an inverse relationship shows that two variables tend to move in the opposite direction, negative correlation refers to the degree of change between two variables.

A positive or direct correlation means there is a strong similarity in the movement of one variable for another, while negative means there is a weak resemblance.

FAQs

Inverse Relationship | Inverse Relationships in Economics, Finance, Math? ›

Definition of Inverse Relationship

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What are examples of inverse relationships? ›

For example, there is a well-described inverse relationship between unemployment and inflation. Parameters, such as time and distance, are inversely related when the value of one parameter increases against the other's decreasing value. If someone walks faster, the time it takes to reach the destination is shortened.

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What is an example of an inverse relationship in business? ›

One key example of an inverse correlation in the financial world is the relationship between stocks and bonds. As stock prices rise, the bond market tends to decline, just as the bond market does well when stocks underperform.

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What is the inverse relation in math? ›

The inverse of a relation is a relation obtained by interchanging or swapping the elements or coordinates of each ordered pair in the relation. Inverse relation in sets can be defined using the ordered pairs. The domain and range of an inverse relation can be written by swapping the domain and range of that relation.

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What is an example of an inverse correlation? ›

For example, if one variable decreases, the other variable will also see lower values. A negative correlation, or inverse correlation, means that the variables move in opposite directions. For example, if the stock market goes up, the value of a bond may go down.

How do you calculate the inverse relationship? ›

The formula to calculate an inverse relationship is: y = k ÷ x. Mathematically, x and y represent the two variables, and k is a constant. As x increases, y decreases, and vice versa. For example, in a half marathon race, y represents time, k represents the distance, and x represents the runner's speed.

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What relationships do inverse functions have? ›

An inverse of a function is the reverse of the function. The domain of the function becomes the range when its inverse is done, and vice-versa. The graphs of both, function and inverse will look like a mirror image of each other. The inverse of function is denoted by f - 1 x .

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What is an inverse relationship in economics? ›

1. What is an inverse relationship? An inverse relationship is a situation where if one variable increases, the other tends to decrease. In other words, when A increases, B tends to decrease.

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What are the types of inverse relations? ›

Standard inverse functions

Function f(x)	Inverse f ⁻¹(y)	Notes
x + a	y − a
a − x	a − y
mx	y/m	m ≠ 0
1/x (i.e. x⁻¹)	1/y (i.e. y⁻¹)	x, y ≠ 0

5 more rows

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What is the inverse relationship in accounting? ›

Full Definition of Inverse Relationship

An inverse correlation, also known as negative correlation (or an inverse relationship), is a contrary relationship between two variables such that they move in opposite directions. For example, with variables A and B, as A increases, B decreases, and as A decreases, B increases.

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What has an inverse relationship with the stock market? ›

Generally, interest rates and the stock market have an inverse relationship.

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What has an inverse relationship with price? ›

Bond yield and price are inversely related. Thus, as the price goes up, the yield decreases, and vice versa. This relationship exists because the bond's coupon rate is fixed, which requires the price in secondary markets to change to align with prevailing interest rates in the market.

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What is an inverse relationship simple example? ›

There are many examples of inverse relationships. One familiar example is the relationship between speed and time. As a traveler increases their speed, the time it takes to reach their destination decreases.

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What is an inverse relation in real life? ›

Real-life examples of inverse proportion can be: Worker count and completion time are inversely proportional: the more workers, the quicker the work is completed. Vehicle speed and distance traveled determine how quickly you can close the distance.

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What operations have inverse relationships in math? ›

Mathematically, inverse operations are opposite operations. Addition is the opposite of subtraction; division is the opposite of multiplication, and so on.

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What is an inverse relation in math? ›

An inverse relation is the inverse of a given relation obtained by Interchanging or swapping the elements of each ordered pair. In other words, if (x, y) is a point in a relation R, then (y, x) is an element in the inverse relation R^–¹. A relation R from set A to B is a subset of the Cartesian product of A and B.

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What is inverse in statistics? ›

Inverse (or negative) correlation is when two variables in a data set are related such that when one is high the other is low. Even though two variables may have a strong negative correlation, this does not necessarily imply that the behavior of one has any causal influence on the other.

What is an example of inverse formula? ›

What Is an Example of An Inverse Function? The example of a inverse function is a function f(x) = 2x + 3, and its inverse function is f^-¹(x) = (x - 3)/2.

What does inverse mean in mathematics? ›

Inverse means the opposite. So in math, an inverse operation can be defined as the operation that undoes what was done by the previous operation. The set of two opposite operations is called inverse operations. For example: If we add 5 and 2 pens, we get 7 pens. Now subtract 7 pens and 2 pens and we get 5 back.

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What is an inverse relationship in an equation? ›

The inverse proportional relationship between two quantities can be shown if the product of two quantities (x × y) is constant, then they depict an inversely proportional relationship. It is expressed as x ∝ 1/y or x = k/y, where k is the constant of proportionality.

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What are the four types of relations in math? ›

Representation of Types of Relations

Types of Relations	Representation
Identity Relation	I or IA= {(a, a), a ∈ A}
Inverse Relation	R−1 = {(b, a): (a, b) ∈ R}
Reflexive Relation	(a, a) ∈ R
Symmetric Relation	aRb ⇒ bRa, ∀ a, b ∈ A

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May 4, 2023

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How many variables are in an inverse relationship? ›

Inverse relationship is a type of correlation that exists between two variables.

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What is an inverse relationship in real life? ›

Worker count and completion time are inversely proportional: the more workers, the quicker the work is completed. Vehicle speed and distance traveled determine how quickly you can close the distance. As one gets farther from the sun, the brightness of the sunlight lessens.

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What are some examples of inverse variation in real life? ›

There are many real-life examples of inverse variation, that can be seen in our day to day life. For example: If the distance travelled by train at constant speed increases then the time taken by it increases too and vice versa. If the number of people is added to a job, the time taken to accomplish the job decreases.

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What is an inverse in everyday life? ›

An example of an action and its inverse that you might experience in your everyday life is when you put on your shoes in the morning and then take them off at night. Untying your shoe is the inverse of tying your shoe. Another example of an action and its inverse is the wrapping and unwrapping of a present.

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What is an example of an inverse relationship in chemistry? ›

Boyle's Law is a relationship between pressure and volume. In this relationship, pressure and volume have an inverse relationship when temperature is held constant. If there is a decrease in the volume there is less space for molecules to move and therefore they collide more often, increasing the pressure.

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