The differential equation for the family...

The differential equation for the family of curves `y = c\ sinx` can be given by

`((dy)/(dx))^(2) = y^(2)cot^(2)x`

`((dy)/(dx))^(2)-(sec x(dy)/(dx))^(2)+y^(2) = 0`

`((dy)/(dx))^(2)=tan^(2)x`

`(dy)/(dx)=y cot x`

Text Solution

Verified by Experts

The correct Answer is:

A, B, D

`y = c sin x" "(i)`
`therefore" "(dy)/(dx)=c cos x" "(ii)`
From (ii)
`((dy)/(dx))^(2) = c^(2) cos^(2) x" "(iii)`
Putting `c =(y)/(sin x) "from (i)", ((dy)/(dx))^(2) = y^(2) cot^(2) x`
Eliminating c from (i) and (ii), `(dy)/(dx) = y cot x`
Squaring and adding (i) and (ii), `y^(2)+((dy)/(dx))^(2)=c^(2)`
Puttting the value of 'c' form (iii), `y^(2)+((dy)/(dx))^(2)=((dy)/(dx)sec x)^(2)`

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The differential equation of the family of lines y = mx is :

`(dy)/(dx) = 0 `

`(d^(2)y)/(dx^(2))=0`

`ydx+xdy=0`

`ydx-xdy=0`

The differential equation representing the family of curve y = A sin ( x+ B) where A and B are parametres is :

`y'' - y = 0 `

`(d^(2)x)/(dy^(2))=1`

`y'' = 0 `

`y'' + y = 0 `

The differential equation representing the family of curves y=A cos (x+B) , where A and B are parameters, is

`(d^(2)y)/(dx^(2))-y =0`

`(d^(2)y)/(dx^(2)) +y =0`

`(d^(2)y)/(dx^(2))=0`

`(d^(2)x)/(dy^(2))=0`