A company manufactures two types of toys, A and B. Type A requires 5 minutes each for cutting and 10 minutes each for assembling. Type B required 8 minutes each for cutting and 8 minutes each for assembling. There are 3 hours available for cutting and 4 hours available for assembling in a day. The profit is ₹50 each on type A and ₹60 each on type B. how many toys of each types should the company manufactures in a day to maximize the profit?


Let the company manufacture x and y numbers of toys A and B.


According to the question,


5X + 8y


Maximize Z = 50x + 60y


The feasible region determined 5X + 8y is given by



The corner points of feasible region are A(0,0) , B(0,22.5) , C(12,15) , D(24,0).The value of Z at corner point is



The maximum value of Z is1500 and occurs at point (12,15).


The company should manufacture 12 A toys and 15 B toys to earn profit of rupees 1500.


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