Answer:
a. 1.35
b. Elastic
Step-by-step explanation:
The formula for calculating the elasticity of supply using the midpoint method is as follows:
Elasticity of Supply = {(Q2 - Q1) ÷ [(Q2 + Q1) ÷ 2]} ÷ {(P2 - P1) ÷ [(P2 + P1) ÷ 2]}
Where,
Q1 = Hours spent at wage wage $50 = 7 hours
Q2 = Hours spent at wage wage $65 = 10 hours
P1 = Old wage = $50
P2 = New wage = $65
Substituting into the elasticity formula, we have:
Elasticity of Supply = {(10 - 7) ÷ [(10 + 7) ÷ 2]} ÷ {(65 - 50) ÷ [(65 + 50) ÷ 2]}
= {3 ÷ [17 ÷ 2]} ÷ {15 ÷ [115 ÷ 2]}
= 0.352941176470588 ÷ 0.260869565217391
Elasticity of Supply = 1.35294117647059 approximately 1.35
Therefore, the elasticity of Juanita’s labor supply between the wages of $50 and $65 per hour is approximately 1.35, which means that Juanita’s supply of labor over this wage range is elastic because the value of the elasticity of supply is greater than 1.