Remote interior angles are the two interior angles of a triangle that are not adjacent to the exterior angle. They are formed by extending one side of the triangle, and in a triangle with angles A, B, and C, they are positioned on opposite sides of the transversal and on different parallel lines. The formula for finding the exterior angle of a polygon is m∠A ∠ A = m∠2 ∠ A.
In mathematics, remote interior angles refer to the pair of angles inside a triangle that are not adjacent or next to each other. They are formed by one side of the triangle. In the diagram above, m∠1, m∠2, and m∠3 are interior angles, while m∠4 is an exterior angle. m∠1 and m∠2 are remote interior angles.
Interior angles refer to interior angles of a polygon or angles formed by a transversal cutting two parallel lines. Remote interior angles are the two non-adjacent interior angles to a given exterior angle. For example, if the exterior angle is at one vertex, the measure of the exterior angle equals the sum of the two remote interior angles.
In summary, remote interior angles are the two interior angles of a triangle that are not adjacent to the exterior angle. They are formed by extending one side of the triangle and are not adjacent to the exterior angle.
📹 Remote Interior Angles
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📹 Exterior and Remote Interior Angles by Shmoop
Unlike anything that enters the Bermuda Triangle, Exterior angles can be found—in more than one way. This video covers how to …
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