Price elasticity of demand can be calculated using the arc or price point method. The **arc price formula** is E`d` equals P`1` plus P`2` over Q`d1` plus Q`d2`, multiplied by the change in Q`d` over the change in P, where P`1` and P`2` are two price points on the demand curve and Q`d1` and Q`d2` are the quantity demanded given P`1` and P`2`.

Therefore, delta Q`d` = Qd`2` - Qd`1`

delta P = P`1` - P`2`

This method is used primarily when you either don't have a mathematical formula for the demand curve, or you aren't familiar with taking derivatives of equations. The arc method essentially assumes a linear demand curve between the two points when estimating the price elasticity. Therefore, the more curved the demand is between the two points, the more inaccurate the estimate.

The **price point elasticity formula** is where elasticity of demand equals P over Qd multiplied by d Qd over d P.

P is the price at which you are evaluating the elasticity of demand.

Q`d` is the quantity demanded at the point you are evaluating elasticity of demand.

dQ`d`/dP is the first derivative of quantity demanded with respect to price.

This is the more accurate method since it uses derivatives to determine the price elasticity at a given point on the demand curve. Calculus allows us to minimize the 'arc' used to estimate elasticity in the arc method, such that it becomes a single point on the demand curve.

## Example: Arc Method

It's summer - let's go to Jamba Juice! This graph shows the demand curve for Jamba Juice in the summer. The demand curve is:

Q`d` = 100 - 2P

Using the arc method, determine the price elasticity at $4/smoothie. Given the demand equation, first determine the quantity demanded at $4/bottle.

Quantity demanded = 100 - 2(4) = 100 - 8 = 92

(P`1`, Q`d1`) = (4, 92)

Now choose a second price to use as the end point to the arc and determine the quantity demanded at that point. The closer the second point is to the original price point, the less inaccurate the estimate will be. Let's pick $4.50/smoothie as P`2`.

Quantity demanded = 100 - 2(4.5) = 100 - 9 = 91

(P`1`, Q`d1`) = (4.5, 91)

Using this formula:

E`d` = ((4 + 4.5 ) / (92 + 91)) * ((91 - 92) / ( 4.5 - 4))

E`d` = (8.5 / 183) * (-1 / 0.5) = .046 * (-2) = -0.092

At $4/bottle, Jamba Juice in summer, given this demand curve, is considered inelastic. Quantity demanded will decrease only by 0.092 percent - that's less than a tenth of a percent - with a one percent increase in price.

## Price-Point Method

Using the same demand curve and price of $4/smoothie, lets evaluate the price elasticity at using price-point elasticity method.

The first derivative of the demand curve with respect to price is -2.

NOTE: Even if you do not know calculus, so long as the demand curve is linear, the first derivative with respect to a given variable will always be the coefficient of that variable. Again, this is only if the demand curve is linear.

Quantity demanded at $4/smoothie = 100 - 2 * $4 = 100 - 8 = 92

Using this formula:

Elasticity of demand = (4 / 92) * (-2) = -0.087

At $4/smoothie, a one percent increase in price will result in only a 0.087 percent decrease in quantity demanded. Again, that is less than a tenth of a percent decrease in quantity demanded. Therefore, this Jamba Juice demand curve at $4/smoothie is inelastic. The percent change in quantity demanded is less than the percent change in price.

## Lesson Summary

An **inelastic demand** is one that is not very sensitive to price change, such that the percent change in quantity demanded will be less than the percent change in price. As seen in the **price point elasticity of demand** example, inelastic demand has a price elasticity between zero and negative one, not inclusive. The two examples also illustrate the slight difference in results when using the two methods. The **arc elasticity of demand** is a less precise estimation, especially when the curve is not exactly linear.