- 6 If F X Y And X Y Are Homogeneous Functions Of X Y Of Degree 6 And 4 Respectively And U X Y F X Y X Y 1 (9.66 KiB) Viewed 28 times
6. If f(x,y) and (x, y) are homogeneous functions of x,y of degree 6 and 4, respectively and u(x, y) = f(x,y) + (x, y),
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6. If f(x,y) and (x, y) are homogeneous functions of x,y of degree 6 and 4, respectively and u(x, y) = f(x,y) + (x, y),
6. If f(x,y) and (x, y) are homogeneous functions of x,y of degree 6 and 4, respectively and u(x, y) = f(x,y) + (x, y), then show that f(x,y) = (123 + 2xy + 2)(x+y).