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 the pieces of the wire respectively so that the sum of the areas is the least.

A wire of length 20cm is cut into two parts which are bent in the form of a square and a circle, then the least value of the sum of areas so formed is

A wire of length a is cut into two parts which are bent, respectively, in the form of a square and a circle. The least value of the sum of the areas so formed is (a^2)/(pi+4) (b) a/(pi+4) a/(4(pi+4)) (d) (a^2)/(4(pi+4))

A wire of length a is cut into two parts which are bent, respectively, in the form of a square and a circle. The least value of the sum of the areas so formed is (a^2)/(pi+4) (b) a/(pi+4) a/(4(pi+4)) (d) (a^2)/(4(pi+4))

A wire of length a is cut into two parts which are bent, respectively, in the form of a square and a circle. The least value of the sum of the areas so formed is (a^2)/(pi+4) (b) a/(pi+4) a/(4(pi+4)) (d) (a^2)/(4(pi+4))

A wire of length a is cut into two parts which are bent, respectively, in the form of a square and a circle. The least value of the sum of the areas so formed is (a^2)/(pi+4) (b) a/(pi+4) a/(4(pi+4)) (d) (a^2)/(4(pi+4))