The general solution of the differential equation (d y/d x)=(x3-2 x tan -1 y)(1+y2) is

Question

The general solution of the differential equation (d y/d x)=(x3-2 x tan -1 y)(1+y2) is (A) 2 tan -1 x=y2-1+2 C e-x2 (B) 2 tan -1 y=x2-1+2 C e-x2 (C) 2 tan -1 y=y2-1+2 C e-x2 (D) 2 tan -1 x=x2-1+2 C e-x2

Tardigrade Admin · Accepted Answer

(1/1+y2) (d y/d x)+2 x( tan -1 y)=x3 Put tan -1 y=z ∴ (1/1+y2) (d y/d x)=(d z/d x) (d z/d x)+(2 x) z=x3 ⇒ z ex2=(1/2) ∫ 2 ex2 x3 d x+C ⇒ 2 ex2( tan -1 y)=x2 ex2-ex2+2 C ⇒ 2 tan -1 y=x2-1+2 C e-x2

Q. The general solution of the differential equation
$\frac{d y}{d x} = (x^{3} - 2 x tan^{- 1} y) (1 + y^{2})$ is

$2 tan^{- 1} x = y^{2} - 1 + 2 C e^{- x^{2}}$

$2 tan^{- 1} y = x^{2} - 1 + 2 C e^{- x^{2}}$

$2 tan^{- 1} y = y^{2} - 1 + 2 C e^{- x^{2}}$

$2 tan^{- 1} x = x^{2} - 1 + 2 C e^{- x^{2}}$

Q. The general solution of the differential equation dxdy​=(x3−2xtan−1y)(1+y2) is

2tan−1x=y2−1+2Ce−x2

2tan−1y=x2−1+2Ce−x2

2tan−1y=y2−1+2Ce−x2

2tan−1x=x2−1+2Ce−x2

1+y21​dxdy​+2x(tan−1y)=x3 Put tan−1y=z ∴1+y21​dxdy​=dxdz​ dxdz​+(2x)z=x3 ⇒zex2=21​∫2ex2x3dx+C ⇒2ex2(tan−1y)=x2ex2−ex2+2C ⇒2tan−1y=x2−1+2Ce−x2

Q. The general solution of the differential equation
$\frac{d y}{d x} = (x^{3} - 2 x tan^{- 1} y) (1 + y^{2})$ is

$2 tan^{- 1} x = y^{2} - 1 + 2 C e^{- x^{2}}$

$2 tan^{- 1} y = x^{2} - 1 + 2 C e^{- x^{2}}$

$2 tan^{- 1} y = y^{2} - 1 + 2 C e^{- x^{2}}$

$2 tan^{- 1} x = x^{2} - 1 + 2 C e^{- x^{2}}$