Solution to Exercise 2.57.
The
value of
—Bertrand Russell (1872–1970)
Exercise
2.57. Prove Theorem 2.12. Given a line and a point not on the line,
there exists a unique line perpendicular to the given line through the given
point.
Proof. Let l be a line and P be a point not on line l. Let A and B be two points on line l. By the Angle Construction Postulate, there is a ray AQ with Q and P on opposites sides of line l and By the Ruler Postulate, there is a point R on line AQ and on the same side of line l as Q such that AR = AP. Note that P and R are on opposite sides of line l. Hence, by the Plane Separation Postulate, there is a point C on line l such that P-C-R. One of the following is true: A-B-C, C = B, A-C-B, C = A, or C-A-B.
Case 1. Assume A-B-C, C = B, or A-C-B. Since and we have Hence, Thus and are a linear pair of congruent angles, since P-C-R. Since a linear pair of congruent angles are right angles, line PR is perpendicular to line
Case 2. Assume C = A. Since and P-A-R, and are a linear pair of congruent angles. Since a linear pair of congruent angles are right angles, line PR is perpendicular to line
Case 3. Assume C-A-B. Then and are a linear pair. Also, and are a linear pair. Hence, by the Supplement Postulate and the definition of supplementary angles, and Therefore,
Since and we have Hence, Thus and are a linear pair of congruent angles, since P-C-R. Since a linear pair of congruent angles are right angles, line PR is perpendicular to line
All cases show that there exists a line through P perpendicular to line l. We need to show that the line is unique. Suppose there are two lines through P that are perpendicular to line l. Let A and B be the points on line l where the two perpendicular lines intersect line l. Let C be a point on line l such that A-B-C. Then is an exterior angle of . By the Exterior Angle Theorem, Since line PB and line PA are perpendicular to line l, and are right angles. Thus, But, this is a contradiction. Therefore, the line through P that is perpendicular to line l is unique.//
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