A rectangular box has a volume 48 and the sum of the length of the twelves edges of the box is 48. The largest integer that can be the length of the box is

has four statements (A,B,C and D) given in Coumn-I and five statements (P,Q,R,S and T) given in Column-II. Any given statement in Column-I can have correct matching with one or more statement(s) given in Column-II. {:(Column-I,Column-II),((A)"A rectangular box has volume 48,and the sum of",(P)1),("length of the twelve edges of the box is 48. The largest",),("integer that could be the length of an edge of the box,is",),((B)"The number of zeroes at the end in the product of first",(Q)2),("20 prime numbers, is"(p),),((C)"The number of solutions of" 2^(2x)-3^(2y)=55 "in which x and y",(R)3),("are integers,is"(0),(S)4),((D)"The number" (7+5sqrt(2))^(1//3)+(7-5sqrt(2))^(1//3)"is equal to",(T)6):}

The dimensions of a rectangular box are integers greater than 1. If the area of one side of this box is 12 and the area of another side 15, what is the volume of the box?

Answer the following A rectangular box has height h cm.Its length is 5 times the height and breadth is 10 cm less than the length.Express the length and the breadth of the box in trems of the heigth.

The volume of a cubical box is 3.375 cubic metres. The length of edge of the box is

A rectangular box has dimensions of length=6, width=4, and height=5. the measure of the angle formed by a diagonal of the box with the base of the box is

Answer the following: (c) A rectangular box has height h cm. Its length is 5 times the heigth and breadth is 10 cm less than the length. Express the length and the breadth of the box in terms of the height.

A rectangular box has height h cm. Its length is 5 times the height and breadth is 10 cm less than the length. Express the length and the breadth of the box in terms of the height.

A box has a base measuring 3 feet by 4 feet. Find the length of the largest rod that can be placed at the bottom of the box.