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Welcome to the isosceles triangle side calculator, where we'll learn all there is to know about an isosceles triangle's sides. In this article, we explain:
Using the isosceles triangle side calculator is as easy as counting to three! All you need to do is:
If you'd like to learn how the side lengths are calculated, read on!
An isosceles triangle is a triangle with two equally long sides (which we call the legs) and are both denoted with a . The remaining side is denoted by b and is unique. The angles adjacent to b (which we call the base angles α ) are also equal due to the legs being equal in length. The remaining angle at the top is called the vertex angle β and is unique.
If the only unknown side is the base side b , our steps depend on what information we have. Usually, we have the leg length a , the base angle α , and the vertex angle β . We can then apply trigonometry to one half of the isosceles triangle, which is a right triangle with angles α and β/2 , a hypotenuse of length a , and a side of length b/2 . From there, we can calculate b/2 and then b .
If you found that this isosceles triangle side calculator isn't acute enough, might we interest you in some of our other isosceles triangle calculators?
An isosceles right triangle has a vertex angle of β = 90° and base angle α = 45° . We can use trigonometry to calculate the remaining side because it's a right triangle, and we know its angles. We want to calculate the side length a , and we have the hypotenuse b . So, we can easily say that a = b × cos(45°) .
Because we know an isosceles right triangle's angles to be 45° , 45° , and 90° , we can work out the equal side lengths a with trigonometry.