Find the general solution of the differential equation \(\frac{dy}{dx}=\frac{2+x^3}{4-y^3}\).(a) x^3-y^3-4y+C=0(b) x^4+8x+y^4-16y+C=0(c) 2x+y^4-4y+C=0(d) x^3+2x+C=0I had been asked this question in an interview for job.This question is from Methods of Solving First Order & First Degree Differential Equations in portion Differential Equations of Mathematics – Class 12

Find the general solution of the differential equation \(\frac{dy}{dx}

1.	Find the general solution of the differential equation \(\frac{dy}{dx}=\frac{2+x^3}{4-y^3}\).(a) x^3-y^3-4y+C=0(b) x^4+8x+y^4-16y+C=0(c) 2x+y^4-4y+C=0(d) x^3+2x+C=0I had been asked this question in an interview for job.This question is from Methods of Solving First Order & First Degree Differential Equations in portion Differential Equations of Mathematics – Class 12
Answer» Right OPTION is (B) x^4+8x+y^4-16y+C=0 The EXPLANATION: GIVEN that, \(\frac{dy}{dx}=\frac{2+x^3}{4-y^3}\) Separating the variables, we get (4-y^3)dy=(2+x^3)dx Integrating both sides, we get \(\INT 4-y^3 \,dy=\int 2+x^3 \,dx\) \(4y-\frac{y^4}{4}=2x+\frac{x^4}{4}+C_1\) x^4+8x+y^4-16y+C=0 (where 4C1=C)

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