I find the area by applying the standard formula for the area of a triangle, which is the length of the base multiplied by the height all divided by two. You should too.
The area of a triangle is (base)x(height)x1/2.So, we put in your values (base=19, height=14) and we get 19x14x1/2=19x7=133.The area of a triangle with a base of 19cm and a height of 14cm is 133.
triangular prism- formula: Abh(area of the base * height)
Area = (base x height) / 2
Volume = 1/3 * Base area * Height So Base area = 3 * Volume / Height
To find the total area of the triangular faces of a pyramid, first identify the number of triangular faces and their base and height dimensions. For each triangular face, use the formula for the area of a triangle: ( \text{Area} = \frac{1}{2} \times \text{base} \times \text{height} ). Calculate the area for each triangular face and then sum these areas to get the total area of all triangular faces.
The area of a triangle is (base)x(height)x1/2.So, we put in your values (base=19, height=14) and we get 19x14x1/2=19x7=133.The area of a triangle with a base of 19cm and a height of 14cm is 133.
Area = 1443.376 cm2
If you mean area, then, the area of a rectangle is width * height. So...50cm^2.
triangular prism- formula: Abh(area of the base * height)
a circle with an area of 50cm has an area of 50cm... why did you even ask this question
Area = (base x height) / 2
All you have to do is find the area divide it by the base and then you get the height.
the base of a triangular sail is 8 m shorter than its height. the area is 24cm^2. Find the base and the height of the sail.
Like all prisms you find the area of one of the triangular faces and then multiply by the height.
Volume = 1/3 * Base area * Height So Base area = 3 * Volume / Height
To find the total area of the triangular faces of a pyramid, first identify the number of triangular faces and their base and height dimensions. For each triangular face, use the formula for the area of a triangle: ( \text{Area} = \frac{1}{2} \times \text{base} \times \text{height} ). Calculate the area for each triangular face and then sum these areas to get the total area of all triangular faces.
The area of a triangular roof section with a base of 7 feet and a height of 3.5 feet is