Answer:
Using the midpoint formula, the 12.5 percent change in price lead to a 10.5 percent change in the quantity demanded.
Step-by-step explanation:
This problem is related to the price elasticity of demand.
The price elasticity of demand is defined as the percent change in quantity demanded divided by the percent change in price.
Using the midpoint formula:
The formula for percent change in quantity demanded is:
Percent change in quantity demanded [tex]=\frac{Q_{2}-Q_{1}}{\frac{(Q_{1}+Q_{2})}{2}} \times 100[/tex]
The formula for percent change in price is:
Percent change in price [tex]=\frac{P_{2}-P_{1}}{\frac{(P_{1}+P_{2})}{2}} \times 100[/tex]
Given:
[tex]Q_{1} = 1000\\Q_{2}=900\\P_{1}=\$15\\P_{2}=\$17[/tex]
Percent change in quantity demanded =
[tex]=\frac{900-1000}{\frac{(900+1000)}{2}} \times 100\\=-10.53\%[/tex]
Percent change in price =
[tex]=\frac{17-15}{\frac{(17+15)}{2}} \times 100\\=12.5\%[/tex]
The complete statement is:
Using the midpoint formula, the 12.5 percent change in price lead to a 10.5 percent change in the quantity demanded.