I was wondering is it possible to solve this without assuming that CAD=DAB. As I use the law of sines, trigonometry and have tried to apply law of cosines. However, I cannot see how you can solve this with just using a and $\alpha$.
Trig question, can this be solved?
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trigonometry
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0Yes indeed, the question was well expressed. – 2012-12-26
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Are you asking if $a$ and $\alpha$ alone uniquely define the triangle? If so, the answer is no.
To see this, draw the point $A$ and two lines from $A$ that make an angle $\alpha$. Then draw a line of length $a$ 'inside' this angle, and then draw $CB$ appropriately. This gives a range of triangles from $|AB| = a$, $|AC| = a \cos \alpha$ to $|AC| = a$, $|AB| = \frac{1}{\cos \alpha} a$.
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0@gnometorule: Thanks for catching that, my typing skills are poor. – 2012-12-26