Let y=y(x) be the solution of the differential equation x(1-x2) (d y/d x)+(3 x2 y-y-4 x3)=0, x 1 with y(2)=-2. Then y(3) is equal to

Question

Let y=y(x) be the solution of the differential equation x(1-x2) (d y/d x)+(3 x2 y-y-4 x3)=0, x >1 with y(2)=-2. Then y(3) is equal to (A) -18 (B) -12 (C) -6 (D) -3

Tardigrade Admin · Accepted Answer

x(1-x2) (d y/d x)+(3 x2 y-y-4 x3)=0 x(1-x2) (d y/d x)+(3 x2-1) y=4 x3 (d y/d x)+((3 x2-1)/(x-x3)) y=(4 x3/(x-x3)) (d y/d x)+P y=Q I F=e∫ P d x=e∫ (3 x2-1/x-x3) d x x-x3=t ⇒ I F=e∫ (-d t/t) =e- textlnt=(1/t) ∴ I F=(1/x-x3) y × I F=∫ Q × I F d x y ((1/ x - x 3))=∫ (4 x 3/ x - x 3) × (1/( x - x 3)) dx =∫ (4 x 3/( x - x 3)2) dx =∫ (4 x /(1- x 2)2) dx ], 1- x 2= K =2 ∫ (- dK / K 2) ], -2 xdx = dK =-2(-(1/ K ))+ c ( y / x - x 3)=(2/ K )+ c ( y / x - x 3)=(2/1- x 2)+ c At x =2, y =-2 (-2/2-8)=(2/1-4)+ c (1/3)=(-2/3)+ c ∴ C =1 ( y / x - x 3)=(2/1- x 2)+1 Put x=3 (y/3-27)=(2/1-9)+1 (y/-24)=-(1/4)+1 (y/-24)=(3/4) y=(3/4)(-24)=-18

Q. Let $y = y (x)$ be the solution of the differential equation $x (1 - x^{2}) \frac{d y}{d x} + (3 x^{2} y - y - 4 x^{3}) = 0, x > 1$ with $y (2) = - 2$ . Then $y (3)$ is equal to

$- 18$

$- 12$

$- 6$

$- 3$

Q. Let y=y(x) be the solution of the differential equation x(1−x2)dxdy​+(3x2y−y−4x3)=0,x>1 with y(2)=−2. Then y(3) is equal to

−18

−12

−6

−3

Q. Let $y = y (x)$ be the solution of the differential equation $x (1 - x^{2}) \frac{d y}{d x} + (3 x^{2} y - y - 4 x^{3}) = 0, x > 1$ with $y (2) = - 2$ . Then $y (3)$ is equal to

$- 18$

$- 12$

$- 6$

$- 3$