![]() Find the perimeter of the frame.Ĭonstruct an isosceles triangle if a given circle circumscribed with a radius r = 2.6 cm is given.Ĭalculate the area of an isosceles triangle, the base measuring 16 cm and the arms 10 cm.Īn isosceles triangle has two sides of length 7 km and 39 km. Calculate the radius of the inscribed (r) and described (R) circle.Īn isosceles triangular frame has a measure of 72 meters on its legs and 18 meters on its base. In an isosceles triangle ABC is |AC| = |BC| = 13 and |AB| = 10. ( T=12 p=16).Įxamples of calculating isosceles triangles:Īn isosceles triangle in word problems in mathematics:Ĭalculate the perimeter of the isosceles triangle with arm length 73 cm and base length of 48 cm. You can also use the given sides and angles to find the area of the triangle using Heron's formula or using trigonometric functions like Sin or Cos. ![]() Once you find the sine of angle A, you can use the inverse sine function (arcsin) to find the measure of angle A in radians or degree. By solving this equation you can find the value of cos(C) and then use the inverse cosine function (arccos) to find the measure of angle C in radians or degree.Īdditionally, you can use the Law of Sines to find the measure of the angles, the formula is: Where c is the length of the non-congruent side, a is the length of the congruent sides, and C is the measure of the angle opposite side c. If you know the lengths of two congruent sides (a,a) and the length of the non-congruent side (c) of an isosceles triangle, you can use the Law of Cosines to find the measure of the angles. To calculate the properties of an isosceles triangle when given certain information, you can use the Pythagorean theorem, the Law of Cosines, or the Law of Sines. An isosceles triangle is a triangle where two sides have the same length. Let's start with the trigonometric triangle area formula:Īrea = (1/2) × a × b × sin(γ), where γ is the angle between the sides.This calculator calculates any isosceles triangle specified by two of its properties. Substituting h into the first area formula, we obtain the equation for the equilateral triangle area: One leg of that right triangle is equal to height, another leg is half of the side, and the hypotenuse is the equilateral triangle side.Īfter simple transformations, we get a formula for the height of the equilateral triangle: ![]() ![]() See our right triangle calculator to learn more about right triangles. Height of the equilateral triangle is derived by splitting the equilateral triangle into two right triangles. The basic formula for triangle area is side a (base) times the height h, divided by 2: H = a × √3 / 2, where a is a side of the triangle.īut do you know where the formulas come from? You can find them in at least two ways: deriving from the Pythagorean theorem (discussed in our Pythagorean theorem calculator) or using trigonometry. The formula for a regular triangle area is equal to the squared side times the square root of 3 divided by 4:Īnd the equation for the height of an equilateral triangle looks as follows:
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