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Evaluate int_(0)^( pi)(xdx)/(a^(2)cos^(2)x+b^(2)sin^(2)x)

Evaluate int_(0)^(pi)(xdx)/(a^(2)cos^(2)x+b^(2)sin^(2)x)

Evaluate int_(0)^(pi)(xdx)/(a^(2)cos^(2)x+b^(2)sin^(2)x)

Evaluate: int_(0)^( pi)(xdx)/(a^(2)cos^(2)x+b^(2)sin^(2)x)

A company manufactures two types of sweaters type A and type B. If costs Rs. 360 to make a type A screws Rs.120 to make a type B sweater. The company can make if at most 300 sweaters and spend at most Rs.72000 a day. The number of sweaters of type B cannot exceeds number of sweater of type A by more than 100. the company makes it a profit of Rs.200 for each sweater of type A and Rs.120 for every sweater of type B. formulate this problem as an LPP to maximise to profit to the company. also solve this LPP to find the maximum profit.

A company manufactures two types of sweaters :type A sweaters type B.It costs Rs 360 to make a type A sweater and Rs 120 to make a type B sweater.The company can make at most 300 sweaters and spend at most Rs72,000 a day.The number of sweaters of type A cannot exceed the number of sweaters of type B by more than 100.The company makes a profit of Rs 200 for each sweater of type A and Rs 20 for every sweater of type B.What is the maximum profit (in Rs.)?

A company manufacutres two types of sweaters type A and type B. It costs 360 to make type A sweater and 120 to make a type B sweater. The company can make atmost 300 sweater and spent atmost 72000 a day. The number of sweaters of type B cannot exceed the number of sweaters of type A by more than 100. The company makes a profit of 200 for each sweater of type A and 120 for every sweater of type B. Formulate this problem as a LPP to maximise the profit to the company.