About The altitude of a Triangle
A perpendicular traced from the vertex of a triangle to the opposite side is called the height of a triangle.
A perpendicular traced from the vertex of a triangle to the opposite side is called the height of a triangle. Three altitudes can be drawn in a triangle because it has three sides. The elevations of different triangles are varied. The altitude of a triangle, also known as its height, is used to calculate its area and is represented by the letter 'h'.
The altitude of a Triangle Definition
A triangle's altitude is the perpendicular line segment traced from the triangle's vertex to the opposite side. With the base of the triangle it touches, the altitude forms a right angle. The letter 'h' represents the height of a triangle and is usually referred to as such. The distance between the vertex and its opposing side can be calculated to determine its size. It's worth noting that each of the triangle's vertices can be used to draw three elevations.
The altitude of a Triangle Properties
- A triangle can have three altitudes.
- Depending on the form of triangle, the altitudes can be inside or outside the triangle.
- The altitude forms a 90° angle with the opposing side.
- The orthocenter of a triangle is the place where the three elevations of the triangle intersect
The altitude of a Triangle Formula
The basic method for calculating a triangle's area is Area = 1/2 (base) (height), where height indicates altitude. We may get the formula for calculating the height (altitude) of a triangle using this formula: (2 Area)/base = altitude Let's look at how to calculate the height of a scalene triangle, an equilateral triangle, a right triangle, and an isosceles triangle.
| Scalene Triangle | h=2√[s(s−a)(s−b)(s−c)]/b |
| Isosceles Triangle | h=√[a2−b2/4] |
| Equilateral Triangle | h=a√3/2 |
| Right Triangle | h=√[xy] |
The altitude of a Scalene Triangle
A scalene triangle has three sides that are of different lengths. We utilise Heron's formula to find the altitude of a scalene triangle, as demonstrated above. h=2√[s(s−a)(s−b)(s−c)]/b
Here, h is the triangle's height or altitude, s is the semi-perimeter, and a, b, and c are the triangle's sides. The altitude of an Isosceles Triangle
An isosceles triangle is defined as a triangle with two equal sides. An isosceles triangle's altitude is perpendicular to its base.
The altitude of an Equilateral Triangle
An equilateral triangle has three sides that are of the same length. The perimeter of an equilateral triangle is equal to 3a if the sides are 'a'. As a result, its semi-perimeter (s) = 3a/2 and the triangle's base (b) = a.Altitude of a Right Triangle
A right triangle, also known as a right-angled triangle, is a triangle in which one of the angles is 90 degrees. When we build a triangle's altitude from the vertex to the hypotenuse of a right-angled triangle, we get two comparable triangles. The Right Triangle Altitude Theorem is what it's called.
The altitude of an Obtuse Triangle
An obtuse triangle is one in which one of the inner angles is greater than 90 degrees. An obtuse triangle's height is outside the triangle.
Important Notes on Altitude of a Triangle
The orthocenter is the location where all three elevations of a triangle intersect.
The orthocenter and the height might both be inside or outside the triangle.
The altitude of an equilateral triangle is the same as the triangle's median.
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Frequently Asked Questions on Altitude of a Triangle Formula
. What is the altitude of a Triangle formula used to find in the equilateral triangle?
The altitude of a triangle formula for an equilateral triangle can be used as
h= (a√ 3)/2. Where 'a' is the side of an equilateral triangle.