This means that the opposite angles are congruent. Notice that the two legs of a triangle are the same length, or congruent. How to find the side of an isosceles triangle value of x equation. Isosceles Triangle Example Problems Isosceles Triangle Problem Theorem #1 This gives the missing piece to prove that by △XYA ≅ △XZA by AAS. Since two right angles have the same measure (90 degrees), we can say that the right angles are congruent. This splits the original isosceles triangle into two smaller right triangles. Now let’s draw in the altitude from angle X to the base. ∠Y ≅ ∠Z (If two sides of a triangle are congruent, the angles opposite them are congruent). Since we know which sides are congruent, we now know what angles are congruent. This will often be given to you by the given labeling of the base. When we are given an isosceles triangle we know the following facts.Īn isosceles triangle has two sides that are congruent (definition of an isosceles triangle). The type of triangle and where the altitude is drawn is important. When an altitude is drawn to the base of an isosceles triangle, it forms two congruent triangles. An altitude is a line that is drawn from the vertice of one angle to the opposite side forming a right angle. One of the common problems that involve an isosceles triangle includes an altitude drawn to the base. Some definitions allow for you to prove that two angles are congruent, some need the extra step to show that two sides are congruent. Make sure to note the definition given to you for what an isosceles triangle is. These two theorems are important for any proofs that ask you to prove a triangle is an isosceles triangle. Once more the congruent angles form the base and the congruent sides are the legs. If we know that two angles are congruent, or have the same measure, than we know that the opposite sides are congruent, or have the same length. Theorem #2 (converse) – If two angles of a triangle are congruent, the sides opposite them are congruent. The converse of this theorem looks at the reverse. Notice that the base of the triangle is created by both angles that are congruent. The arcs that are in the angles are indicating that the angles have the same measure, or are congruent. The single lines on the legs of the isosceles triangles are tick marks indicating that the sides have the same length, or are congruent. To find the opposite angle you want to look at the angle that the side is not a part of. This means that if we know that two sides are congruent in a triangle, we know that two angles are congruent as well. Isosceles Triangle Theorems Theorem #1 – If two sides of a triangle are congruent, the angles opposite them are congruent. Now let’s see how to find the missing sides of an isosceles triangle and calculate their lengths. Knowing that an isosceles triangle has two sides that are equal leads us to the first theorem that is associated with isosceles triangles. Oftentimes a problem will use this vocabulary to give information. The two sides that are the same length are referred to as the legs and the third side is called the base. Often abstract or complicated shapes are broken into smaller shapes such as a triangle. Many triangles found in the real world can be considered isosceles, including a section of a slice of pizza. Isosceles Triangle Properties, Characteristics & Uses These words make a difference when considering if a triangle is also an equilateral triangle as well as an isosceles triangle. Theorem #2 (converse) – If two angles of a triangle are congruent, the sides opposite them are congruent.ĭefinition: An isosceles triangle is defined as a triangle having two congruent sides or two sides that are the same length.Īn isosceles triangle can also be an equilateral triangle, but it doesn’t have to be.ĭefinitions for these triangles typically include the word “only” or “exactly”.Theorem #1 – If two sides of a triangle are congruent, the angles opposite them are congruent.Isosceles Triangle Properties, Characteristics & Uses.
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