Two tailors A and B earn ₹150 and ₹200 per day respectively. A can stich 6 shirts and 4 pants per day, while B can stitch 10 shirts and 4 pants per day. Form a L.P .P to minimize the labour cost to produce (stitch) at least 60 shirts and 32 pants and solve it graphically.

Two tailors A and B earn Rs. 150 and Rs. 200 per day respectively. A can stich 6 shirts and 4 pants per day, while B can stitch 10 shirts and 4 pants per day. Form a L.P .P to minimize the labour cost to produce (stitch) at least 60 shirts and 32 pants and solve it graphically.

Two tailors A and B are paid ₹ 225 and ₹ 300 per day respectively.A can stitch 9 shirts and 6 pants while B can stitch 15 shirts and 6 pants per day.Form a linear programming problem to minimize the labour cost to produce at least 90 shirts and 48 pants.Solve the problem graphically.

The tailors A and B are per Rs.225 and Rs.300 per day respectively. A can stitch 9 shirts and 6 pants while B can stitch 15 shirts and 6 pants per day. Form a linear programming problem to minimize the labour cost to produce atleast 90 shirts and 45 pants. Solve the problem graphically.

Two tailors A and B earns 15 and 20 per dayrespectively.A can stitch 6 shirts and 4 paints while Bcan stitch 10 shirts and 4 paints per day.To minimise the cost to stitch 60 shirts and 32 paints,how manydays should they work?

Two tailors, A and B, earn 300 and 400 per day respectively. A can stitch 6 shirts and 4 pairs of trousers while B can stitch 10 shirts and 4 pairs of trousers per day. To find how many days should each of them work and if it is desired to produce at least 60 shirts and 32 pairs of trousers at a minimum labour cost, formulate this as an LPP.

Two tailors P and Q earn Rs. 350 and Rs. 450 per day respectively. Tailor P can stitch 6 shirts and 3 trousers while tailor Q can stitch 7 shirts and 3 trousers per day. Formulate the LPP, if it is desired to produce at least 51 shrits and 24 trousers at a minimum labour cost?

(Diet Problem)Every gram of wheat provides 0.1 g of protein and 0.25 g of carbohydrates. The corresponding values for rice are 0.05 g and 0.5 g respectively.Wheat costs₹ 4 per/kg and rice ₹ 6 per/kg.The minimum daily requirements of protein and carbohydrates for an average child are 50 g and 200 g respectively.In what quantities should wheat and rice be mixed in the daily diet so as to provide the maximu, daily requirements of protein and carbohydrates at minimum cost?Frame an L.P.P and solve it graphically.

A can do a piece of work in 10 days, while B can do it in 6 days.B worked at it for 4 days. How long will A take to finish the remaining work?

A small firm manufactures gold rings and chains. The total number of rings and chains manufactured per day is atmost 24. It takes 1 hour to make a ring and 30 minutes to make a chain. The maximum number of hours available per day is 16. If the profit on a ring is Rs. 300 and that on a chain is Rs 190, find the number of rings and chains that should be manufactured per day, so as to earn the maximum profit. Make it as an L.P.P. and solve it graphically.

A manufacturer produces nuts and bolts. It takes 2 hours work on machine A and 3 hours on machine B to produce a package of nuts. It takes 3 hours on machine A and 2 hours on machine B to produce a package of bolts. He earns a profit of Rs. 24 per package on nuts and Rs. 18 per package on bolts. How many packages of each should be produced each day so as to maximize his profit, if he operates his machines for at the most 10 hours a day. Make an L.P.P. from above and solve it graphically ?