General solution of differential equations dydx + y = 1y ≠ 1 is
log11 - y = x + C
log1 - y = x + C
log1 + y = x + C
log11 - y = - x + C
The degree of the differential equation 1 + dydx22 = d2ydx2 is
3
2
1
4
The integrating factor of the differential equation x . dydx + 2y = x2 is x ≠ 0
x
logx
x2
elogx
The order of the differential equation
ydydx = xdydx + dydx3 is
The general solution of the differential equation (x + y)dx + xdy = 0 is
x2 + y2 = c
2x2 - y2
x2 + 2xy = c
y2 + 2xy = c
The order and degree of the differential 1 + 3dydx23 = 4d3ydx3 are
1, 2/3
3, 1
3, 3
1, 2
The differential equation of all straight lines passing through the point (1, - 1)is
y = x + 1dydx + 1
y = x + 1dydx - 1
y = x - 1dydx + 1
y = x - 1dydx - 1
The solution of the differential equation d2ydx2 = e- 2x is
y = e- 2x4
y = e- 2x4 + cx + d
y = e- 2x4 + cx2 + d
y = e- 2x4 + c + d
The solution of the differential equation dydx + sin2y = 0 is
x = coty + c
y = cotx + c
x = 2cscycoty + c
y = 2sinycosy + c
Family y = Ax + A3 ofcurve is represented by the differential equation ofdegree
None of these