Before jumping into the topic of corresponding angles, let’s first remind ourselves about angles, parallel and non-parallel lines, and transversal lines. Show In Geometry, an angle is composed of three parts: vertex and two arms or sides. The vertex of an angle is where two sides or lines of the angle meet, while arms of an angle are simply the angle’s sides. Parallel lines are two or more lines on a 2-D plane that never meet or cross. On the other hand, non-parallel lines are two or more lines that intersect. A transversal line is a line that crosses or passes through two other lines. A transverse line can pass through two parallel or non-parallel lines. What is a Corresponding Angle?Angles formed when a transversal line cuts across two straight lines are known as corresponding angles. Corresponding angles are located in the same relative position, an intersection of transversal and two or more straight lines. The angle rule of corresponding angles or the corresponding angles postulates that the corresponding angles are equal if a transversal cuts two parallel lines. Corresponding angles are equal if the transversal line crosses at least two parallel lines. The diagram below illustrates corresponding angles formed when a transversal line crosses two parallel lines: From the above diagram, the pair of corresponding angles are:
Proof of Corresponding Angles In the figure above, we have two parallel lines. We need to prove that. We have the straight angles: From the transitive property, From the alternate angle’s theorem, Using substitution, we have, Hence, Corresponding angles formed by non-parallel linesCorresponding angles are formed when a transversal line intersects at least two non-parallel lines that are not equal, and in fact, they don’t have any relation with each other. Illustration:
Corresponding interior angleA pair of corresponding angles is composed of one interior and another exterior angle. Interior angles are angles that are positioned within the corners of the intersections. Corresponding exterior angleAngles that are formed outside the intersected parallel lines. An exterior angle and interior angle make a pair of corresponding angles. Illustration: Interior angles include; b, c, e, and f, while exterior angles include; a, d, g, and h. Therefore, pairs of corresponding angles include:
We can make the following conclusions about corresponding angles:
How to find corresponding angles?One technique of solving corresponding angles is to draw the letter F on the given diagram. Make the letter to face in any direction and relate the angles accordingly. Example 1 Given ∠d = 30°, find the missing angles in the diagram below. Solution Given that ∠d = 30° ∠d = ∠b (Vertically opposite angles) Therefore, ∠b = 30° ∠b = ∠ g= 30° (corresponding angles) Therefore, ∠f = 30° ∠a+ 30° = 180° ∠ a = 150° ∠ a = ∠ e = (corresponding angles) Therefore, ∠e = 150° ∠d = ∠h = 30° (corresponding angles) Example 2 The two corresponding angles of a figure measure 9x + 10 and 55. Find the value of x. Solution The two corresponding angles are always congruent. Hence, 9x + 10 = 55 9x = 55 – 10 9x = 45 x = 5 Example 3 The two corresponding angles of a figure measure 7y – 12 and 5y + 6. Find the magnitude of a corresponding angle. Solution First, we need to determine the value of y. The two corresponding angles are always congruent. Hence, 7y – 12 = 5y + 6 7y – 5y = 12 + 6 2y = 18 y = 9 The magnitude of a corresponding angle, 5y + 6 = 5 (9) + 6 = 51 Applications of Corresponding AnglesThere exist many applications of corresponding angles which we ignore. Observe them if you ever get a chance.
When two lines intersect they form two pairs of opposite angles, A + C and B + D. Another word for opposite angles are vertical angles. Vertical angles are always congruent, which means that they are equal. Adjacent angles are angles that come out of the same vertex. Adjacent angles share a common ray and do not overlap. The size of the angle xzy in the picture above is the sum of the angles A and B. Two angles are said to be complementary when the sum of the two angles is 90°. Two angles are said to be supplementary when the sum of the two angles is 180°. If we have two parallel lines and have a third line that crosses them as in the ficture below - the crossing line is called a transversal When a transversal intersects with two parallel lines eight angles are produced. The eight angles will together form four pairs of corresponding angles. Angles 1 and 5 constitutes one of the pairs. Corresponding angles are congruent. All angles that have the same position with regards to the parallel lines and the transversal are corresponding pairs e.g. 3 + 7, 4 + 8 and 2 + 6. Angles that are in the area between the parallel lines like angle 2 and 8 above are called interior angles whereas the angles that are on the outside of the two parallel lines like 1 and 6 are called exterior angles. Angles that are on the opposite sides of the transversal are called alternate angles e.g. 1 + 8. All angles that are either exterior angles, interior angles, alternate angles or corresponding angles are all congruent. Example The picture above shows two parallel lines with a transversal. The angle 6 is 65°. Is there any other angle that also measures 65°? 6 and 8 are vertical angles and are thus congruent which means angle 8 is also 65°. 6 and 2 are corresponding angles and are thus congruent which means angle 2 is 65°. 6 and 4 are alternate exterior angles and thus congruent which means angle 4 is 65°. Video lessonFind the measure of all the angles in the figure |