Solution to Exercise 2.20.
Complete the proof that the Ruler Placement Postulate is not independent, Theorem 2.5.
Geometry is a skill of the eyes and the hands as well as the mind.
Exit book to another website.Jean Pedersen

 

Theorem 2.5. The Ruler Placement Postulate is not independent of the other axioms.

Proof. Let P and Q be two distinct points. Then by Postulate 1, there is a line l that contains P and Q. Assume  is a ruler, such a ruler exists by Postulate 3. Set

 

Define  by g(X) = k[f(X)  f(P)] for all X on line l. We now show g satisfies the conditions of Postulate 3.
      We first show g is a one-to-one function. Let A and B be points on l. Suppose g(A) = g(B). Thus k[f(A)  f(P)] = k[f(B)  f(P)]. Since k is nonzero, f(A)  f(P) = f(B)  f(P). Hence f(A) = f(B). Thus, since f is a one-to-one function, A = B. Therefore, g is a one-to-one function.
      Next show g is onto the real numbers. Let r be a real number. Since f is onto the real numbers, there is a point A on line l such that f(A) = r/k + f (P). Thus

 

Hence g is onto the real numbers.
      Show g satisfies the distance condition. Let A and B be points on l. Thus

 

      Finally, show the signs of the coordinates of the two points.

g(P) = k[f(P)  f(P)] = 0

and

 

Hence g(P) = 0 and g(Q) > 0.
      Therefore, the Ruler Placement Postulate follows from the other axioms and is not independent.//

 

Solutions for Chapter 2Back to Solutions for Chapter Two.

Ch. 2 Euclidean/NonEuclidean TOC  Table of Contents

  Timothy Peil  Mathematics Dept.  MSU Moorhead

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