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How to Find the Altitude of a Triangle? Let us learn how to find out the altitude of a scalene triangle, equilateral triangle, right triangle, and isosceles triangle. Altitude Formula. The important formulas for the altitude of a triangle are summed up in the following table. The following section explains these formulas in detail.
Altitude of a triangle is basically the perpendicular line segment drawn from the vertex to the opposite side of the triangle. The altitude or height of a triangle may lie inside or outside the triangle. Learn with examples at BYJU’S.
To find the altitude of a triangle, we first need to identify the type of triangle. After the identification of the type, we use the specific formulas given above for each type to find the value of the altitude.
Whether you are looking for the triangle height formulas for special triangles such as the right, equilateral or isosceles triangle or any scalene triangle, this calculator is a safe bet – it can calculate the heights of the triangle, as well as triangle sides, angles, perimeter, and area.
Learn the formula for how to find the altitude of a triangle and calculate altitudes for equilateral, isosceles, and right triangles. Want to see the video?
The altitude of a triangle is the perpendicular line segment that is drawn from the vertex of a triangle to the opposite side known as the base, or the line containing the base. Note that the altitude may be perpendicular to the base, or to the extension of the base.
The altitude of a triangle formula for a right triangle is given as h= √xy, where x and y are the length of segments of hypotenuse divided by altitude. The altitude of the right triangle is equal to the geometric mean of the segments made by that altitude on the hypotenuse.