Answer to Question #157082 in Differential Equations for mustafa

Let's solve this expression:

"f(x, y, z, p,q) = p + q - 3pq = 0" 1)

Charpit's auxilary equations for 1):

"\\large\\frac{dp}{\\large\\frac{\\delta f}{\\delta x} +p\\large\\frac{\\delta f}{\\delta z} }=\\large\\frac{dq}{\\large\\frac{\\delta f}{\\delta y} +q\\large\\frac{\\delta f}{\\delta z} }=\\large\\frac{dz}{-p\\large\\frac{\\delta f}{\\delta p} -q\\large\\frac{\\delta f}{\\delta q} }=\\large\\frac{dx}{\\large\\frac{-\\delta f}{\\delta p} }=\\large\\frac{dy}{\\large\\frac{\\delta f}{\\delta q}}"

"\\large\\frac{dp}{0+p.0} = \\large\\frac{dq}{0+q.0} + \\large\\frac{dz}{-p(1-3q)-q(1-3p)} = \\large\\frac{dx}{3q-1} = \\large\\frac{dy}{3p-1}" 2)

Taking the first fraction of (2), we obtain "dp=0"

Integrating it, we get "p = a"

Substituting the value p = a in (1), we get "q = \\large\\frac{a}{3a-1}"

Now, putting the values of p and q respectively from(3) and (4) in "dz = pdx+qdy," we obtain

"dz= adx +" "\\frac{a}{3a-1} dy"

Integrating it, we obtain "z = ax + \\large\\frac{ay}{3a-1}+b"

Thus, the required comlete integral is "z = ax + \\large\\frac{ay}{3a-1}+b"