What are the order and degree, respectively, of the differential equation d3ydx32 = y4 + dydx5 ?
4, 5
2, 3
3, 2
5, 4
The differential equation of the family of curves y = pcos (ax) + qsin(ax), where p, q are arbitrary constants, is
d2ydx2 - a2y = 0
d2ydx2 - ay = 0
d2ydx2 + ay = 0
d2ydx2 + a2y = 0
The equation of the curve passing through the point ( - 1, - 2) which satisfies dydx = - x2 - 1x3, is
17x2y - 6x2 + 3x5 - 2 = 0
6x2y + 17x2 + 2x5 - 3 = 0
6xy - 2x2 + 17x5 + 3 = 0
17x2y + 6xy - 3x5 + 5 = 0
What is the order of the differential equation whose solution is
y = acosx + bsinx +ce - x =d, where a, b, c and d are arbitrary constants ?
1
2
3
4
What is the solution of the differential equationlndydx = ax + by ?
axax + beby = c
1aeax + 1beby = 0
aeax + be - bx = c
1beax + 1be - by = c
If μ = eaxsinbx and ν = eaxcosbx, then what is μdudx + vdvdx = ?
ae2ax
a2 + b2eax
abe2ax
a + beax
A.
μdudx + νdvdx= eaxsinbxaeax . sinbx + beaxcosbx + eax . cosbxaeax . cosbx - beax . sinbx= e2axasin2bx + bsinbx . cosbx +acos2bx - bsinbx . cosbx= ae2x
If y = sinlnx, then which one of the following is correct ?
d2ydx2 + y = 0
d2ydx2 = 0
x2d2ydx2 + xdydx + y = 0
x2d2ydx2 - xdydx + y = 0
What is the solution of the differential equationdxdy = x + y + 1x + y - 1 ?
y - x + ln(x + y) = c
y + x + 2ln(x + y) = c
y - x + 2ln(x + y) = c
What is limx→π62sin2x + sinx - 12sin2x - 3sinx + 1 = ?
- 12
- 13
- 2
- 3
What is d2ydy2 = ?
- d2ydx2 - 1dydx - 3
d2ydx2 - 1dydx - 2
- d2ydx2dydx - 3
d2ydx2 - 1