Show that : sin^-1(2xsqrt(1-x^2)) = 2 si...

Show that : `sin^-1(2xsqrt(1-x^2)) = 2 sin^-1 x, -1/sqrt2lexle1/sqrt2`

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Show that : sin^-1(2xsqrt(1-x^2)) = 2 cos^-1 x, 1/sqrt2lexle1

Find dy/dx in the following: y=sin^-1(2x sqrt(1-x^2)) , -1/sqrt2ltxlt1/sqrt2

Prove that sin^(-1)(2x.sqrt(1-x^(2)))=2cos^(-1)x,(1)/(sqrt(2))lexlt1

Prove that : tan^-1((2xsqrt(1-x^2))/(1-2x^2)) = 2 sin^-1 x when: 1/sqrt2 le x le 1/sqrt2

int (x(sin^-1x))/(sqrt(1-x^2))dx

Prove that : 2 sin^-1 x = sin^-1 (2x sqrt(1-x^2)), |x| le (1/(sqrt2)

Prove that tan(sin^-1 x) = (x/(sqrt 1-x^2)), 1 x 1 < 1

Prove that tan^-1(x/(sqrt(a^2 - x^2)) = sin^-1 (x/a), |x| < a.

Show that : sin^-1(2xsqrt(1-x^2)) = 2 sin^-1 x, -1/sqrt2lexle1/sqrt2
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