Let y = y₁ (x) and y = y₂ (x) be two distinct solutions of the differential equation = x + y, with y₁ (0) = 0 and y₂(0) = 1 respectively. Then, the number of points of intersection of y = y₁ (x) and y = y₂ (x) is

Option 1 -

Option 2 -

Option 3 -

Option 4 -

2 Views | Posted 2 months ago

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1 Answer

Answered by

alok kumar singh | Contributor-Level 10

2 months ago

Correct Option - 1

Detailed Solution:

$\frac{d y}{d x} - y = x,$ linear differential equation.

IF = e^-x

$y . e^{- x} = \int x e^{- x} d x = - e^{- x} (x + 1) + C$

$y = - (x + 1) + C . e^{x}$

$y_{2} (x) = - (x + 1) + 2 e^{x}$

y₂ > y₁, no solution.

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Let y = y₁ (x) and y = y₂ (x) be two distinct solutions of the differential equation = x + y, with y₁ (0) = 0 and y₂(0) = 1 respectively. Then, the number of points of intersection of y = y₁ (x) and y = y₂ (x) is

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Let y = y1 (x) and y = y2 (x) be two distinct solutions of the differential equation = x + y, with y1 (0) = 0 and y2 (0) = 1 respectively. Then, the number of points of intersection of y = y1 (x) and y = y2 (x) is

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Let y = y₁ (x) and y = y₂ (x) be two distinct solutions of the differential equation = x + y, with y₁ (0) = 0 and y₂(0) = 1 respectively. Then, the number of points of intersection of y = y₁ (x) and y = y₂ (x) is