If x sin(a+y)+sina.cos(a+y)=0, then pro...

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

CONTINUITY AND DIFFERENTIABILITY
MODERN PUBLICATION|Exercise EXERCISE 5(a) (SHORT ANSWER TYPE QUESTIONS)|52 Videos
CONTINUITY AND DIFFERENTIABILITY
MODERN PUBLICATION|Exercise EXERCISE 5(a) (LONG ANSWER TYPE QUESTIONS (I))|39 Videos
APPLICATIONS OF THE INTEGRALS
MODERN PUBLICATION|Exercise CHAPTER TEST|12 Videos
DETERMINANTS
MODERN PUBLICATION|Exercise Chapter test 4|12 Videos

Similar Questions

Explore conceptually related problems

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

If x sin(a+y)+sin a cos(a+y)=0, prove that (dy)/(dx)=(s in^(2)(a+y))/(sin a)

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

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

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

If sin (a + y) + sin a * cos (a + y) = 0. Prove that: (dy) / (dx) = ((sin ^ (2) (a + y)) / (sin a))

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

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