Consumer surplus with continuous demand
Summary
- Setup
- Two goods model
- Both goods infinitely divisible
- \(p_2=1\) , \(p_1x_1+x_2=m\)
- Quasilinear preferences \(u\left( x_1,x_2 \right)=v\left( x_1 \right)+x_2\)
- Strictly convex preferences: \(v\left( x_1 \right)\) concave
- Result:
- First order condition: \(v'\left( x_1 \right)=p_1\)
- Inverse demand function: \(p_1\left( x_1 \right)=v'\left( x_1 \right)\)
\[v\left( x_1 \right)=\int_{0}^{x_1}{ p_1\left( t \right)dt }\]
- \(v\left( x_1 \right)\) is gross benefit or the gross consumer’s surplus from consuming \(x_1\) units of good 1
- \(v\left( x_1 \right)-p_1x_1\) is consumer’s surplus or the net consumer’s surplus from consuming \(x_1\) units of good 1