The internal length and breadth of a cuboidal store are 16 m and 13 m

1.	The internal length and breadth of a cuboidal store are 16 m and 13 m respectively and its height is 11 m. There is another cubical store whose internal length, breadth and height are 8 m each. How many total cubical boxes each of side one metre can be placed in these two stores to a height of 7 metres?1. 22882. 28003. 19044. 1968
Answer» Correct Answer - Option 3 : 1904 Concept Volume of cuboid = length × breadth × height Volume of cube = side³ Number of cubical boxes that can fit inside cuboidal/cubical store = Volume of cuboidal/cubical store ÷ Volume of one cubical box Calculation Length and breadth of cuboidal store = 16 m and 13 m respectively Boxes are to be placed to a height of 7 m so, height = 7 m Volume of cuboidal store = 16 × 13 × 7 = 1456 m³ Similarly, Length and breadth of cubical box = 8 m each and height = 7 m Volume of cubical store = 8 × 8 × 7 = 448 m³ Volume cubical box of side 1 m = 1 × 1 × 1 = 1 m³ Number of boxes to be placed = (1456 ÷ 1) + (448 ÷ 1) = 1904 So, the number of boxes = 1904.

The internal length and breadth of a cuboidal store are 16 m and 13 m respectively and its height is 11 m. There is another cubical store whose internal length, breadth and height are 8 m each. How many total cubical boxes each of side one metre can be placed in these two stores to a height of 7 metres?1. 22882. 28003. 19044. 1968

Answer» Correct Answer - Option 3 : 1904

Concept

Volume of cuboid = length × breadth × height

Volume of cube = side³

Number of cubical boxes that can fit inside cuboidal/cubical store = Volume of cuboidal/cubical store ÷ Volume of one cubical box

Calculation

Length and breadth of cuboidal store = 16 m and 13 m respectively

Boxes are to be placed to a height of 7 m

so, height = 7 m

Volume of cuboidal store = 16 × 13 × 7 = 1456 m³

Similarly, Length and breadth of cubical box = 8 m each and height = 7 m

Volume of cubical store = 8 × 8 × 7 = 448 m³

Volume cubical box of side 1 m = 1 × 1 × 1 = 1 m³

Number of boxes to be placed = (1456 ÷ 1) + (448 ÷ 1) = 1904

So, the number of boxes = 1904.