Revision as of 00:24, 7 November 2007 edit 67.171.141.197 (talk) →Definition ← Previous edit		Revision as of 00:25, 7 November 2007 edit undo 67.171.141.197 (talk) →Proof of linearity and equality of slope of Engel curves Next edit →
Line 21: To prove that the [[Engel curve]]s of a function in Gorman polar form are [[linear]], apply [[Roy's identity]] to the utility function to get a [[Marshallian demand function]] for an individual (<math>i</math>) and a good (<math>n</math>): :<math>x^i_n(p,m^i) = -\frac{\frac{\partial uv^i(p,m^i)}{\partial p_n}}{\frac{\partial uv^i(p,m^i)}{\partial m^i}} = \frac{\partial f^i(p)}{\partial p_n} + \frac{\partial g(p)}{\partial p_n}\cdot\frac{m-f^i(p)}{g(p)}</math> This is linear in income (<math>m</math>), so the change in an individual's demand for some commodity with respect to a change in that individual's income,

Gorman polar form: Difference between revisions