The differential equation of the curve for which the initial ordinate of any tangent is equal to the corresponding subnormal (a) is linear (b) is homogeneous of second degree (c) has separable variables (d) is of second order

Find the equation of the curve in which the perpendicular from the origin on any tangent is equal to the abscissa of the point of contact.

The curve for which the slope of the tangent at any point is equal to the ration of the abcissa to the ordinate of the point is

The differential equation of the family of curves, y^2 = 4a ( x + b) , a b in R , has order and degree respectively equal to :

The equation of the curve for which the slope of the tangent at any point is given by (x+y+1)((dy)/(dx))=1 is (where, c is an arbitrary constant)

The differential equation whose solution is A x^2+B y^2=1 , where A and B are arbitrary constants, is of (a) second order and second degree (b) first order and second degree (c) first order and first degree (d) second order and first degree

The differential equation of the family of curves, y^2 = 4a(x+b)(x+b),a,b,in R , has order and degree respectively equal to :

Form the differential equation of the family of curves y=asin(b x+c),\ a\ a n d\ c being parameters.

The differential equation of all parabolas each of which has a latus rectum 4a and whose axes are parallel to the x-axis is (a) of order 1 and degree 2 (b) of order 2 and degree 3 (c) of order 2 and degree 1 (d) of order 2 and degree 2

The equation of the curve which is such that the portion of the axis of x cut off between the origin and tangent at any point is proportional to the ordinate of that point is

Find the equation of the curve passing through origin if the slope of the tangent to the curve at any point (x ,y)i s equal to the square of the difference of the abscissa and ordinate of the point.