To find the area of an equilateral triangle, you need to calculate the length of half the side length and substitute it into the Pythagorean theorem to find the height. S = 10 + 10 + 10 /2. The equilateral triangle ABC has X as its side. Example 1: If you are given altitude h and you want to calculate side a, then you need to use formula which connects h and a.. How to use the formula of half the product of the base and height to calculate the area of a triangle? S = 30 /2. D is mid point of BC.Therefor BD=DC=X/2. where a is the length of each side of the triangle. Example 2: If you are given area A and you want to calculate perimeter P then you need to make two steps to get the solution. units. As we know that the area of Triangle is given by; A = $$\frac{base\times height}{2}$$ Also, the included angle is given as 30° . Area of a parallelogram given base and height. The diagram at the right shows when to use each of these formulas. After finding your height, substitute your values for base and height into the formula for area of a triangle to find the area. Therefore we use heron's formula that is:-⎆ Area of triangle = So, S = Perimeter /2 . Area of a rectangle. Area of a triangle (Heron's formula) Area of a triangle given base and angles. ... Now apply the Pythagorean theorem to get the height (h) or the length of the line you see in red. Then find the area of the given triangle. To find :-Area of triangle. The area of an equilateral triangle is the amount of space that it occupies in a 2-dimensional surface. Area of a rhombus. Area of a square. Area of Equilateral Triangle. Area of triangle = × Base × Height . we know that sinB = sin30° = 1/2 = 0.5 if a perpendicular AD is drawn from A to side BC, then AD is the height. SolutioN:-Height is not given, so we can't use 1/2 × base × height. We then apply the formula for the area of a triangle… Home List of all formulas of the site; Geometry. Area of equilateral triangle can be found using the formula given below. The height of the equilateral triangle EFG creates two 30-60-90 triangles, each with a hypotenuse of 10 and a short side equal to 5. Area of a triangle given sides and angle. Area of a trapezoid. Area of Triangle (given base and height) A triangle is a 3-sided polygon. S = 15. Let us find its height. We are given the height so we need to find the length of the sides. Take an equilateral triangle of the side “a” units. You could also substitute it into sin60^@, cos30^@, tan30^@, or tan60^@ to find the height. Derivation of the formula: Let one side length of the equilateral triangle is “a” units. A = bh. Then if we call the side length a, the side across from 30 degrees will be a/2 units long. Now here we are supposed to find the area of triangle without height. So, the area of an equilateral triangle … The area of an equilateral triangle can be found by using the Pythagorean formula: Start with any equilateral triangle. Hence, the formula of the triangle is given as : Area of Δ ABC = 1/2 * AB * BC * sinB. We know that the long side of 30-60-90 triangle (here the height of EFG) is equal to √3 times the short side, or 5√3. Show Step-by-step Solutions So we have two adjacent sides and an included angle. Area of an equilateral triangle. Area of a triangle given base and height. Area of plane shapes. Area of Equilateral Triangle = (√3/4)a 2 sq. Since this is an equilateral triangle, the triangles formed by height will be special triangles with 30, 60 and 90 angles. Then we can write according to the Pythagorean Theorem Given:-Side of equilateral triangle is 10 cm, it means all side of triangle is of 10 cm. Deriving the Formula to Find the Area of Equilateral Triangle. The length of the base and height to calculate the area half the of. 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