![]() ![]() We just learned that when one of the angles is an obtuse angle, the other two angles add up to less than 90°. Property 3: The sum of the other two angles in an obtuse triangle is always smaller than 90°. Observe the image given below to understand the same with an illustration. Hence, a triangle cannot have two obtuse angles because the sum of all the angles cannot exceed 180 degrees. For instance, if one of the angles is 91°, the sum of the other two angles will be 89°. We can observe that one of the angles measures greater than 90°, making it an obtuse angle. Consider the obtuse triangle shown below. We know that the angles of a triangle sum up to 180°. ![]() Property 2: A triangle can only have one obtuse angle. Consider the ΔABC, side BC is the longest side which is opposite to the obtuse angle ∠A. Property 1: The longest side of a triangle is the side opposite to the obtuse angle. An obtuse triangle has four different properties. Heron's formula to find the area of an obtuse triangle is: \(\sqrt \), where, (a b c) is the perimeter of the triangle and S is the semi-perimeter which is given by (s): = (a b c)/2Įach triangle has its own properties that define them. Consider the triangle ΔABC with the length of the sides a, b, and c. ![]() The area of an obtuse triangle can also be found by using Heron's formula. We extend the base as shown and determine the height of the obtuse triangle.Īrea of ΔABC = 1/2 × h × b where BC is the base, and h is the height of the triangle.Īrea of an Obtuse-Angled Triangle = 1/2 × Base × Height Obtuse Triangle Area by Heron's Formula The altitude or the height from the acute angles of an obtuse triangle lies outside the triangle. In the given obtuse triangle ΔABC, we know that a triangle has three altitudes from the three vertices to the opposite sides. Once the height is obtained, we can find the area of an obtuse triangle by applying the formula mentioned below. Since an obtuse triangle has a value of one angle more than 90°. To find the area of an obtuse triangle, a perpendicular line is constructed outside of the triangle where the height is obtained. Perimeter of obtuse-angled triangle = (a b c) units. Hence, the formula for the perimeter of an obtuse-angled triangle is: The perimeter of an obtuse triangle is the sum of the measures of all its sides. Let's learn each of the formulas in detail. There are separate formulas to calculate the perimeter and the area of an obtuse triangle. Therefore, it is called an obtuse-angled triangle or simply an obtuse triangle. The triangle below has one angle greater than 90°. Centroid and incenter lie within the obtuse-angled triangle while circumcenter and orthocenter lie outside the triangle. Therefore, a right-angle triangle cannot be an obtuse triangle and vice versa. Similarly, a triangle cannot be both an obtuse and a right-angled triangle since the right triangle has one angle of 90° and the other two angles are acute. Hence, the triangle is an obtuse-angled triangle where a 2 b 2 < c 2Īn obtuse-angled triangle can be a scalene triangle or isosceles triangle but will never be equilateral since an equilateral triangle has equal sides and angles where each angle measures 60°. For example, in a triangle ABC, three sides of a triangle measure a, b, and c, c being the longest side of the triangle as it is the opposite side to the obtuse angle. The side opposite to the obtuse angle is considered the longest. if one of the angles measure more than 90°, then the sum of the other two angles is less than 90°. ![]() An obtuse-angled triangle has one of its vertex angles as obtuse and other angles as acute angles i.e. An obtuse-angled triangle or obtuse triangle is a type of triangle whose one of the vertex angles is bigger than 90°. ![]()
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