One side of a square is 10 inches long. How many 1 square inch tiles are needed to cover the area of the square?
To find the number of 1 square inch tiles needed to cover the area of the square, we need to calculate the total area of the square and then divide it by the area of each tile.
1. Identify the side length of the square: The problem states that one side of the square is 10 inches long.
2. Calculate the area of the square: The area of a square is found by squaring the length of one side. Therefore, the area of the square is 10 inches × 10 inches = 100 square inches.
3. Divide the area of the square by the area of each tile: Since each tile has an area of 1 square inch, we divide the total area of the square (100 square inches) by the area of each tile (1 square inch) to find the number of tiles needed.
100 square inches ÷ 1 square inch = 100 tiles
Therefore, 100 1 square inch tiles are needed to cover the area of the square.
To find the number of 1 square inch tiles needed to cover the area of the square, we need to calculate the total area of the square and divide it by the area of each tile.
The area of a square is given by the formula: Area = side * side
Since one side of the square is 10 inches long, we can substitute the value into the formula: Area = 10 inches * 10 inches = 100 square inches.
Now, to calculate the number of 1 square inch tiles needed, we need to divide the total area of the square by the area of each tile.
Number of tiles = Total area of square / Area of each tile
Number of tiles = 100 square inches / 1 square inch = 100 tiles
Therefore, you would need 100 one square inch tiles to cover the area of the square with a side length of 10 inches.