Divide 64 into two parts such that the sum of the cubes of the two parts is minimum.

Divide unity into two parts such that the sum of their cubes is (7)/(16)

An angle theta is divided into two parts so that the ratio of the tangents of the parts is k, if the difference, sin phi = (k-1)/(k+1) sin theta

Divide 24 into two parts such that their product is maximum.

Divide 24 into two parts such that their product is maximum.

Divide 5 into two parts such that the product of the square of one and the cube of the other may be the greatest possible.

Divide 50 into two parts such that the sum of their reciprocals may be (1)/(12) .

a is divided into two such parts that one part is equal to the square of the other part.

Divide 56 into two parts, so that thrice of the first part becomes 48 more than one third of the second part.