What is the differential equation corresponding to y2 - 2ay + x2 = a2 by eliminating a2 ? where p =
What is the general solution to the differential equation
ydx - (x + 2y2)dy = 0 ?
x = y2 + cy
x = 2cy2
x = 2y2 + cy
None of the above
Let f(x + y) = f(0)f(y) for all x and y. Then what is f'(5) equal to [where f'(x) is the derivative of f(x)] ?
l2 = l3
B.
The order and degree of the differential equation
are respectively :
3 and 2
2 and 2
2 and 3
1 and 3
The differential equation of minimum order by eliminating the arbitrary constants A and C in the equation y = A[sin (x + C) + cos(x + C)] is :
y'' + (sin(x) + cos(x))y' = 1
y'' = (sin(x) + cos(x))y'
y'' = (y')2 + (sin(x)cos(x))
y'' + y = 0