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Question
Using vector method, prove that cos(α – β) = cos α cos β + sin α sin β
Solution
Let `bar"a" = bar"OA", bar"b" = bar"OB"`
Using vector method
Prove that cos(α – β) = cos α cos β + sin α sin β
Draw AL and BM perpendicular to the X axis, then
`bar"OL" = bar"OA"` = cos α
`|bar"OL"| = |bar"OA"|` cos α = cos α
`|bar"LA"| = |bar"OA"|` sin α = sin α
`bar"OL" = |bar"OL"|"i"` = cos α `hat"i"`
`bar"LA" = sin alpha (+ hat"j")`
`baralpha = bar"OA" = bar"OL" + bar"LA"`
= `cos alpha hat"i" + sin alpha hat"j"` ........(1)
Similarly `bar"b" = cos beta hat"i" + sin beta hat"j"` ......(2)
The angle between `bar"a"` and `bar"b"` is α – ß and so `bar"a"*bar"b" = |bar"a"*bar"b"|`
= `|bar"a"||bar"b"|` cos(α – ß) = cos(α – ß) ........(3)
From (1) and (2)
`bar"a"*bar"b" = (cos alpha hat"i" + sinalpha hat"j")*(cos beta hat"i" + sin beta hat"j")`
= cos α cos ß + sin α sin ß .......(4)
From (3) and (4)
cos(α – ß) = cos α cos ß + sin α sin ß
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