Найдите (2cos^2a-sin 2a)/(2sin^2a-sin 2a) если tga=-1/4

[latex] \cfrac{2\cos^2 \alpha -\sin2 \alpha }{2\sin^2 \alpha -\sin2 \alpha }= \cfrac{2\cos^2 \alpha -2\sin \alpha \cos \alpha }{2\sin^2 \alpha -2\sin \alpha \cos \alpha }= \cfrac{2\cos \alpha (\cos \alpha -\sin \alpha )}{2\sin \alpha (\sin \alpha -\cos \alpha )} = \\ \\ \\ = \cfrac{\cos \alpha (\cos \alpha -\sin \alpha )}{-\sin \alpha (\cos \alpha -\sin \alpha )} =- ctg \alpha \\ \\ \\ tg \alpha \cdot ctg \alpha =1 \\ \\ ctg \alpha = \cfrac{1}{tg \alpha } \\ \\ ctg \alpha = \cfrac{1}{- \frac{1}{4} }=-4[/latex] [latex]-ctg \alpha =-(-4)=4[/latex]