Triangle Inequality

From Department of Mathematics at UTSA
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The triangle inequality is a very important geometric and algebraic property that we will use frequently in the future.

Theorem 1 (Triangle Inequality): Let and be real numbers. Then .

  • Proof of Theorem: For and as real numbers we have that and . If we add these inequalities together we get that or rather which is equivalent to saying that .

There are also some other important results similar to the triangle inequality that are important to mention.


Corollary 1: If and are real numbers then .

  • Proof of Corollary 1: We first write and therefore applying the triangle inequality we get that and therefore . Subtracting from both sides we get that .
  • Now we write and therefore applying the triangle inequality we get that and therefore and subtracting from both sides we get that which is equivalent to .
  • Therefore .


Corollary 2: If and are real numbers then .

  • Proof of Corollary 2: By the triangle inequality we get that and so then . Therefore .


Corollary 3: If then .

  • Proof of Corollary 3: We note that by the triangle inequality. Applying the triangle inequality multiple times we eventually get that .

A more formal proof of Corollary 3 can be carried out by Mathematical Induction.

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