The degree and order of the differential equation of the family of all parabolas whose axis is X-axis, are respectively
2, 1
1, 2
3, 2
2, 3
Solution of the differential equation (x + y - 1)dx + (2x+ 2y - 3)dy = 0
y + x + log (x + y - 2) = c
y + 2x + log (x + y - 2) = c
2y + x + log (x + y - 2) = c
2y + 2x + log (x + y - 2) = c
The differential equation for the family of curve x2 + y2 - 2ay = 0, where a is an arbitrary constant, is
2(x2 - y2)y' = xy
2(x2 + y2)y' = xy
(x2 - y2)y' = 2xy
(x2 + y2)y' = 2xy
will be parabola, if
a = 0
b = 1
a = 1
None of these
A.
a = 0
The given equation is