A wire of length 2 units is cut into two parts which are bent respectively to from a square ofside c units and a circle of radius r units if the sum of the sum of the areas of the square and the circle so fromed is minimum then

A wire of length 2 units is cut into two parts which are bent respectively to form a square of side = x units and a circle of radius = r units. If the sum of the areas of the square and the circle so formed is minimum, then :

A wire of length 2 units is cut into two parts which are bent respectively to form a square of s i d e=x units and a circle of radius =r units. If the sum of the areas of the square and the circle so formed is minimum, then :

A wire of length 2 units is cut into two parts which are bent respectively to form a square of s i d e=x units and a circle of r a d i u s=r units. If the sum of the areas of the square and the circle so formed is minimum, then : (1) 2x=(pi+4)r (2) (pi+4)x=pir (3) x=2r (4) 2x=r

A wire of length 2 units is cut into two parts which are bent respectively to form a square of side = x units and a cricle of radius = r units. If the sum of areas of the square and the circle so formed is minimum, then

A wire of length 2 units is cut into two parts which are bent respectively to form a square of side = x units and a cricle of radius = r units. If the sum of areas of the square and the circle so formed is minimum, then

A wire of length l is cut into two parts which are bent respectively in the form of a square and a circle. What are the lengths of pieces of wire so that the sum of areas is least ?

A wire of length l is cut into two parts which are bent respectively in the form of a Square and a circle. What are the lengths of pieces of wire so that the sum of areas is least?