Marginal analysis
Marginal revenue,
Elasticity
Price elasticity of demand:
E = %d_q / %d_p.
Income Elasticity of demand:
E = %d_q / %d_i.
Negative, means inferior good. Generic cereal, with more money, less generic cereal.
Imagine the gov. says the income will increase 5% then my delta q will increase 2.5%, given an elasticity of .5.
- Normal good. Positive
- Inferior good. Negative.
How responsive are customers to change of income.
Cross price elasticity of demand (the price of a related good):
E = %d_q / %d_Pr where Pr is the price of a related good
- Negative: Complementary.
- Positive: Substitute.
Related goods can be of two types:
- Substitute of your product (McDonalds vs BurgerKing)
- Complementary (Tennis rackets vs Tennis balls)
Any variable in the : Q = a + bP + cN + dI + cR can give us an elasticity.
Set elasticity == -1 or using marginal analysis, take the derivative and equal the equation to zero.
What is the price P* that will maximize revenue:
max Total revenue.
Derivative in is called marginal revenue.
TR -> MR = 0
Given : Q = 1124.43 - 1.617P
Solve for P in terms of Q
` p = 695.72 - 1/1.617 Q`
TR = ((695.72 - 1/1.617 Q) Q)
TR = 695.72Q - 1/1.617 Q^2 (take the derivative)
MR = 695.72 - 2/1.617Q = 0 and now we can solve for the optimal Q
2/1.627Q = 695.72
Q = 562.21
Optimal quantity is going to be 562.21, now we can use it in the price equation and the price will be $347.34. This the optimal price to charge. The total revenue, price times quantity. Price elasticity of demand at this point will be -1.
E = -1.617 x 347 / 562.21 = -1
This is when the revenue is maximized.