Answer to Question #291167 in Differential Equations for jinnni

Question #291167

The differential equation which has y 4 = Cx3 − 3 as its general solution is:

Expert's answer

"y^ 4 = Cx^3 \u2212 3" ...(1)

Differentiating both sides w.r.t "x" , we get

"4y^3y'=3Cx^2\\Rightarrow C=\\frac {4y^3y'}{3x^2}"

Put the value of C in equation (1), we get

"y^4=\\frac {4y^3y'}{3x^2}\\times x^3-3=\\frac {4xy^3y'}{3}-3=\\frac {4xy^3y'-9}{3}\\\\\n3y^4-4xy^3y'+9=0"

is the differential equation.

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