If `sin y = x sin (a + y)`, then show that: ` dy/dx = sina/(1 - 2x \ cos a + x^2)`.

Similar Questions

Explore conceptually related problems

If sin y=x sin(a+y), then show that: (dy)/(dx)=(sin a)/(1-2x cos a+x^(2))

If sin y = x sin (a + y) prove that (dy) / (dx) = (sin a) / (1-2x cos a + x ^ (2))

If y = x sin y prove that (dy) / (dx) = (sin y) / ((1-x cos y))

If y=(sin x-x cos x)(cos x+x sin x), show that (dy)/(dx)=x sin2x-x^(2)cos2x

If y,=x sin y, prove that (dy)/(dx),=(sin y)/((1-x cos y))

If x sin(a+y)+sina.cos(a+y)=0 , then prove that (dy)/(dx) = (sin^(2)(a+y))/(sina)

if sin x=y sin(x+b) show that (dy)/(dx)=(sin b)/(sin^(2)(x+b))

If y = a sin x + b cos x , show that y^2+((dy)/(dx))^2=a^2+b^2

If y=x sin(a+y), prove that (dy)/(dx)=(sin^(2)(a+y))/(sin(a+y)-y cos(a+y))