- #1
SP90
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Homework Statement
Given the following two triangles:
Show that [itex]v \cos{\delta} = V(1-\cos{\beta})+u\cos(\alpha - \beta)[/itex]
The Attempt at a Solution
Using the cosine law I've got:
[itex]v^{2}=x^{2}+V^{2}-2xV\cos{(\theta + \beta)}[/itex]
and [itex]u^{2}=x^{2}+V^{2}-2xV\cos{(\theta)}[/itex]
I figured maybe using the rule for [itex]\cos{(A+B)}=\cos{(A)}\cos{(B})-\sin{(A)}\sin{(B)}[/itex] would work, but that leads to introducing sines, which seems like it would get messy, especially since there are no sines in the solution.
I'm not sure how to proceed here. I'm confused where the 1 would come from unless going through [itex]\cos^{2}{x}+\sin^{2}{x}=1[/itex], but that makes no sense as the other terms aren't squared.
Any help or direction on this would be appreciated.
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