A consumer has Rs. 25 to spend on two goods x and y. The price
of good x is Rs. 3 and that of good y is Rs. 4. The continuously
differentiable utility function of the consumer is U (x, y) = 12x + 16y –x2
– y2 where x ≥ 0 and y ≥ 0
Can we treat it as a case of Perfect Substitutes ?
so vasudha can we say that beyond rs 50 ,even if his money income increases he wud not move away from 6,8....???????coz at m=50, x=6 nd y=8....his m optimum....rationally he wud not use any income >50....????
MU from both goods starts declining after x=6 and y=8 ie DMU sets in. Thus, Rs 50 (6*3+ 4*8) is the optimal income level. If income increases beyond this, consumption of x and y will not increase