If A - C C - A = B, then A,B,C are in - Vidyadip

MCQ

If $\frac{{\sin A - \sin C}}{{\cos C - \cos A}} = \cot B,$ then $A,B,C$ are in

✓
$A.P.$
B
$G.P.$
C
$H.P.$
D
None of these

✓

Answer

Correct option: A.

$A.P.$

a
(a) $\frac{{\sin A - \sin C}}{{\cos C - \cos A}} = \cot B$

==>$\frac{{2\cos \frac{{A + C}}{2}\sin \frac{{A - C}}{2}}}{{2\sin \frac{{A + C}}{2}\sin \frac{{A - C}}{2}}} = \cot B$

$ \Rightarrow \cot \frac{{(A + C)}}{2} = \cot B$

==> $B = \frac{{A + C}}{2}$

Thus $A, B, C$ will be in $A.P.$

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