Respuesta :

Answer:

[tex]\frac{\sin^{6} x-\cos^{6}x }{1-\sin^{2}x \cos^{2}x  } =1-2\cos^{2} x[/tex] proved.

Step-by-step explanation:

We have to prove that [tex]\frac{\sin^{6} x-\cos^{6}x }{1-\sin^{2}x \cos^{2}x  } =1-2\cos^{2} x[/tex]

So, the left hand side = [tex]\frac{\sin^{6} x-\cos^{6}x }{1-\sin^{2}x \cos^{2}x  }[/tex]

= [tex]\frac{(\sin^{2}x-\cos^{2} x )(\sin^{4} x+\cos^{4}x+\sin^{2}x \cos^{2}x)   }{{1-\sin^{2}x \cos^{2}x  }}[/tex] {Since we have the formula [tex]a^{3} -b^{3}= (a-b) (a^{2}  +ab+b^{2} )[/tex]}

= [tex]\frac{(\sin^{2}x-\cos^{2} x )[(\sin^{2}x+\cos^{2}x  )^{2}-2\sin^{2}x\cos^{2} x+ \sin^{2}x\cos^{2} x ]}{{1-\sin^{2}x \cos^{2}x  }}[/tex] {Since we have the formula [tex]a^{2}+b^{2} = (a+b)^{2} -2ab[/tex]}

= [tex]\frac{(\sin^{2}x-\cos^{2} x )(1-\sin^{2}x \cos^{2}x)}{(1-\sin^{2}x \cos^{2}x)}[/tex]

= [tex](\sin^{2}x-\cos^{2} x )[/tex]

= [tex]1-2\cos^{2} x[/tex] {Since [tex]\sin^{2}x =1-\cos^{2} x[/tex]}

= Right hand side

Hence, proved.

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