Examples
Last updated at December 16, 2024 by Teachoo
Transcript
Example 20 For any two vectors š ā and š ā , we always have |š ā + š ā| ⤠|š ā| + |š ā| (triangle inequality).To Prove: |š ā + š ā| ⤠|š ā| + |š ā| We first prove trivially, |š ā + š ā| = |0 ā" + " š ā | = |š ā | "|" š ā"| + |" š ā"|" = 0 + |š ā | = |š ā | |š ā + š ā| = |š ā+0 ā | = |š ā | "|" š ā"| + |" š ā"|" = |š ā | + 0 = |š ā | Therefore, the inequality |š ā + š ā| ⤠|š ā| + |š ā| is satisfied trivially. Let us assume š ā ā š ā & š ā ā š ā |š ā + š ā|2 = (š ā + š ā) . (š ā + š ā) = š ā . š ā + š ā . š ā + š ā . š ā + š ā. š ā = š ā . š ā + š ā . š ā + š ā . š ā + š ā. š ā = š ā . š ā + 2š ā. š ā + š ā. š ā = |š ā|2 + 2š ā. š ā + |š ā|2 = |š ā|2 + 2|š ā||š ā| cos Īø + |š ā|2 Thus, |š ā + š ā|2 = |š ā|2 + 2|š ā||š ā| cos Īø + |š ā|2 (Using prop : š ā. š ā = |š ā|2) (Using prop : š ā. š ā = |š ā|2) We know that cos Īø ⤠1 Multiplying 2|š ā||š ā| on both sides 2|š ā||š ā| cos Īø ⤠2|š ā||š ā| Adding |š ā|2 + |š ā|2 on both sides, |š ā|2 + |š ā|2 + 2|š ā||š ā| cos Īø ⤠|š ā|2 + |š ā|2 + 2 |š ā| |š ā| |š ā + š ā|2 ⤠(|š ā| + |š ā|) 2 Taking square root both sides |š ā + š ā| ⤠(|š ā| + |š ā|) Hence proved.