Consider the differential equation y2dx +(x-(1/y)) dy = 0. If y (1) = 1, then x is given by :

Question

Consider the differential equation y2dx +(x-(1/y)) dy = 0. If y (1) = 1, then x is given by : (A) 4-(2/y)-(e(1/y)/e) (B) 3-(2/y)+(e(1/y)/e) (C) 1+(1/y)-(e(1/y)/e) (D) 1-(2/y)+(e(1/y)/e)

Tardigrade Admin · Accepted Answer

(dx/dy) + (x/y2) = (1/y3) I.F = e∫(1/y2)dy = e (1/y) so x . e -(1/y) = ∫(1/y3)e -(1/y)dy Let (-1/y) = t ⇒ (1/y2)dy = dt ⇒ I = ∫ tetdt = et - tet = e-(1/y)+(1/y) e -(1/y) + c ⇒ xe-(1/y) = e -(1/y) + (1/y)e -(1/y) + c ⇒ x = 1 + (1/y) + c.e 1/y since y (1) = 1 ∴ c = -(1/e) ⇒ x = 1 +(1/y) - (1/e ). e1/y

Q. Consider the differential equation $y^{2} d x + (x - \frac{1}{y}) d y = 0$ . If $y (1) = 1$ , then x is given by :

$4 - \frac{2}{y} - \frac{e ^{\frac{1}{y}}}{e}$

$3 - \frac{2}{y} + \frac{e ^{\frac{1}{y}}}{e}$

$1 + \frac{1}{y} - \frac{e ^{\frac{1}{y}}}{e}$

$1 - \frac{2}{y} + \frac{e ^{\frac{1}{y}}}{e}$

Q. Consider the differential equation y2dx+(x−y1​)dy=0. If y(1)=1, then x is given by :

4−y2​−eey1​​

3−y2​+eey1​​

1+y1​−eey1​​

1−y2​+eey1​​

dydx​+y2x​=y31​ I.F=e∫y21​dy=ey1​ sox.e−y1​=∫y31​e−y1​dy Let y−1​=t ⇒y21​dy=dt ⇒I=∫tetdt=et−tet =e−y1​+y1​e−y1​+c ⇒xe−y1​=e−y1​+y1​e−y1​+c ⇒x=1+y1​+c.e1/y since y(1)=1 ∴c=−e1​ ⇒x=1+y1​−e1​.e1/y

Q. Consider the differential equation $y^{2} d x + (x - \frac{1}{y}) d y = 0$ . If $y (1) = 1$ , then x is given by :

$4 - \frac{2}{y} - \frac{e ^{\frac{1}{y}}}{e}$

$3 - \frac{2}{y} + \frac{e ^{\frac{1}{y}}}{e}$

$1 + \frac{1}{y} - \frac{e ^{\frac{1}{y}}}{e}$

$1 - \frac{2}{y} + \frac{e ^{\frac{1}{y}}}{e}$