If the cost and revenue funcation of a product are respectively C(x) = 5x + 700 and R(x) = 15 x + 100 , where 'x' is the number of products then what will be the value of 'x' to get profit ?

The cost and revenue functions of a product are given by C(x)=2x+400\ a n d\ R(x)=6x+20 respectively, where x is the number of items produced by the manufacturer. How many items the manufacturer must sell to realize some profit?

The cost and revenue functions of a product are given by C(x)=2x+400 and R(x)=6x+20 respectively,where x is the number of items produced by the manufacturer.How many items the manufacturer must sell to realize some profit?

A manufacture's cost function C(x) and revenue function R(x) of x units of a product are respectively given by C(x)=3x+250 and R(x)=8x+30 Find the number of products the manufacture must sell to earn some profit.

The cost and revenue functions of a product and givenm by C(x)=2x+400 and R(x)=6x+20 respectively,where x is the number of items produced by the manufacturer.How many items the manufacturer must sell to realise some profit?

A firm produces x units of a product. The cost function C(x) and revenue function R(x) of x unit are given by C(x)=4(x+200) and R(x)=8(x+55). Find the minimum number of product the firm must produce the firm must produce to run as a profitable concern.

A company manufactures cassettes. Its cost and revenue functions are C(x)=26000+30x and R(x)= 43x, respectively, where x is the number of cassettes produced and sold in a week. How many cassettes must be sold by the company to realise some profit ?

A company manufactures cassettes. Its cost and revenue functions are C(x)=26000+30x and R(x)= 43x, respectively, where x is the number of cassettes produced and sold in a week. How many cassettes must be sold by the company to realise some profit ?

The cost function of a product is given by C(x)=(x^(3))/(3)-45x^(2)-900x+36 where x is the number of units produced. How many units should be produced to minimise the marginal cost ?