A mural made of triangular tiles has an area of 1750square centimeters.each triangle has a height that is 3 centimeters longer than its base of 2 centimetrs.how many triangular tiles are there

Shortest answer: 350 tiles.

Longer answer: 1750/5 = 350.
Longest answer: Each triangle has an area of (2*(2+3))/2, which is 5. 1750/5 = 350.

To find the number of triangular tiles, we need to determine the area of a single triangle and then divide the total area of the mural by the area of a single triangle.

The area of a triangle can be calculated using the formula:
Area = (base * height) / 2.

Given that the height of each triangle is 3 centimeters longer than its base, the height can be expressed as the base + 3.

Substituting the given values into the area formula:
1750 = (2 * (2 + 3)) / 2.

Simplifying the equation:
1750 = (2 * 5) / 2.

1750 = 10 / 2.

1750 = 5.

To find out how many triangular tiles there are, we divide the total area of the mural by the area of a single triangle:
1750 / 5 = 350.

Therefore, there are 350 triangular tiles in the mural.

To find the number of triangular tiles in the mural, we first need to calculate the area of each triangular tile.

The formula to find the area of a triangle is:

Area = (base * height) / 2

Given that the base of each triangle is 2 cm and the height is 3 cm longer than the base (2+3 = 5), we can substitute these values into the formula:

Area = (2 * 5) / 2 = 10 / 2 = 5 square cm

Now that we know the area of each triangular tile is 5 square cm, we can calculate the total number of tiles by dividing the total area of the mural by the area of each tile:

Total number of tiles = total area / area of each tile

Total area = 1750 square cm
Area of each tile = 5 square cm

Total number of tiles = 1750 / 5 = 350

Therefore, there are 350 triangular tiles in the mural.