Transcript Geometry
1.5 Segment and Angle Bisectors Geometry What does it mean to bisect something? To cut or divide into two equal parts. Bisecting a Segment • The midpoint of a segment is the point that divides, or bisects, the segment into two congruent segments. • A segment bisector is a segment, ray, line, or plane that intersects a segment at its midpoint Finding the Midpoint If you know the coordinates of the endpoints of a segment, you can calculate the coordinates of the midpoint. You simply take the mean, or average, of the x-coordinates and of the y-coordinates. This method is summarized as the Midpoint Formula Midpoint Formula Find the Midpoint • Plot the points A(-2, 3) and B(5, -2) • Use the Midpoint Formula to find the coordinates of the midpoint of segment AB. • Graph a Segment Bisector Find the Midpoint • Plot the points D(3, 5) and E(-4, 0) • Use the Midpoint Formula to find the coordinates of the midpoint of segment DE. • Graph a segment bisector Find the Other Endpoint of a Segment • Plot the points X(-3, 1) and M(3, -4) • The midpoint of segment XY is M. One endpoint is X. Find the coordinates of the other endpoint, Y. • Plot Y Find the Other Endpoint of a Segment • Graph the points R(-1, 7) and M(2, 4) • The midpoint of segment RP is M. One endpoint is R. Find the coordinates of the other endpoint, P. • Plot P Bisecting an Angle • An angle bisector is a ray that divides an angle into two adjacent angles that are congruent. Example 1 The ray FH bisects the angle EFG. Given that the measure of angle EFG = 120 degrees, what are the measures of angle EFH and angle HFG? Example 2 Angle CBA is bisected by ray BD. The measure of angle DBA is 65 degrees. Find the measure of angle CBA. Example 3 In the diagram, ray RQ bisects angle PRS. The measures of the two congruent angles are (x+40) degrees and (3x – 20) degrees. Solve for x. (x + 40) (3x – 20)