A rectangle with sides of lengths 15 and 13 unitsis divided into squares of sides of unit length. Thennumber of rectangles which can be formed with thesides of odd length, is

A rectangle with sides of lengths (2 n-1) and (2 m-1) units is divided into squares of unit lengths. The number of rectangles which can be formed with sides of odd length is

A rectangle with sides of lengths (2n-1) and (2m-1) units is divided into squares of unit length. The number of rectangles which can be formed with sides of odd length, is (a) m^2n^2 (b) mn(m+1)(n+1) (c) 4^(m+n-1) (d) non of these

A rectangle with sides of lengths (2n-1) and (2m-1) units is divided into squares of unit length. The number of rectangles which can be formed with sides of odd length, is (a) m^2n^2 (b) mn(m+1)(n+1) (c) 4^(m+n-1) (d) non of these

A rectangle with sides of lengths (2n-1) and (2m-1) units is divided into squares of unit length. The number of rectangles which can be formed with sides of odd length, is (a) m^2n^2 (b) mn(m+1)(n+1) (c) 4^(m+n-1) (d) non of these

A rectangle with sides of lengths (2n-1) and (2m-1) units is divided into squares of unit length.The number of rectangles which can be formed with sides of odd length,is (a) m^(2)n^(2) (b) mn(m+1)(n+1) (c) 4^(m+n-1) (d) non of these

A rectangle with sides 2m-1 and 2n-1 divided into squares of unit length the number of rectangles which can be formed with sides of odd length is

A rectangle with sides (2m-1) and (2n -1) is divided into squares of unit length by drawing parallel lines as shown in the diagram, then the number of rectangles possible with odd side lengths is :

The given shape is divided into a square and two rectangles. What is the length of rectangle Y ? What is the area of rectangle Y?

A rectangle is inscribed in a equilaternal triangle of side length 2a units . The maximum area of this rectangle can be