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(D-1)2(D2+1)2 y= sin 2(x/2)+ex+x
Find the complete integral of the equation
( ∂z/∂x1 ) ( ∂z/∂x2 ) ( ∂z/∂x3 ) = z3x1x2x3
(1+y2)dx=(tan-1 y-x)dy
sin-1(dy / dx) = x + y
Find the integral surface of the PDE
(x - y) p + ( y - x - z)q = z .
A tightly stretched string with fixed end points x = 0 and x = l is initially in a position
given by y = y0 sin3(πx/l) . It is released from rest from the initial position. Find the
displacement y(x, t) .
Solve the differential equation
xcos(y/x) (ydx+xdy) = ysin(y/x) (xdy-ydx)
Find a continuous solution of the Intial Value Problem
dy/dx + y = g(t), y(0) = 0
where g(t) = {2, when 0<=t<=1
and g(t) = {0, when t>1
Find the surface which is orthogonal to the one parameter system z = c xy( x2 + y2 )
which passes through the hyperbola , x2 - y2 = a2 , z =0.
Find the general integral of the equation
(x - y) p + (y - x - z) q = z
and the particular solution through the circle z = 1, x2 + y2 =1
