CUET · MATHS · PYQ PAPER 2025
The particular solution of the differential equation \(e^x \sqrt{1-y^2} d x+\frac{y}{x} d y=0\), given that \(y=1\), when \(x=0\), is:
- A \(\sqrt{1-y^2}=(x-1) e^x+1\)
- B \(\sqrt{1-y^2}=(x+1) e^x-1\)
- C \(\sqrt{y-y^2}=(x+1) e^x-1\)
- D \(\sqrt{y}=(x-1) e^x-1\)
Answer & Solution
Correct Answer
(A) \(\sqrt{1-y^2}=(x-1) e^x+1\)
Step-by-step Solution
Detailed explanation
\(e^x \sqrt{1-y^2} d x=-\frac{y}{x} d y\) \(-x e^x d x = \frac{y}{\sqrt{1-y^2}} d y\) \(\int -x e^x d x = \int \frac{y}{\sqrt{1-y^2}} d y\) \(e^x (1-x) = -\sqrt{1-y^2} + C\) \(\sqrt{1-y^2} = (x-1)e^x + C\) Given \(y=1\) when \(x=0\): \(\sqrt{1-1^2} = (0-1)e^0 + C\)…
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