Least Number of Square Tiles Required to Pave a Rectangular Courtyard
Video Explanation
Watch the video below to understand the complete solution step by step:
Solution
Question: A rectangular courtyard is 18 m 72 cm long and 13 m 20 cm broad. It is to be paved with square tiles of the same size. Find the least possible number of such tiles.
Step 1: Convert All Dimensions into Centimetres
Length = 18 m 72 cm = (18 × 100) + 72 = 1872 cm
Breadth = 13 m 20 cm = (13 × 100) + 20 = 1320 cm
Step 2: Find the Side of the Largest Square Tile
The side of the largest square tile is the HCF of 1872 and 1320.
Using Euclid’s division algorithm:
1872 = 1320 × 1 + 552
1320 = 552 × 2 + 216
552 = 216 × 2 + 120
216 = 120 × 1 + 96
120 = 96 × 1 + 24
96 = 24 × 4 + 0
∴ HCF (1872, 1320) = 24 cm
Step 3: Find the Number of Tiles Required
Number of tiles along the length = 1872 ÷ 24 = 78
Number of tiles along the breadth = 1320 ÷ 24 = 55
Total number of tiles = 78 × 55 = 4290
Final Answer
∴ The least possible number of square tiles required is 4290.
Conclusion
Thus, by using the HCF of the length and breadth of the courtyard, we find that the minimum number of square tiles needed is 4290.