Question:
The differential equation \(\left|\frac{dy}{dx}\right|+|y|+3=0\) admits
The differential equation \(\left|\frac{dy}{dx}\right|+|y|+3=0\) admits
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If an expression contains \(|A|+|B|+c\) with \(c>0\), it can never become zero.
Updated On: Jan 3, 2026
- infinite number of solutions
- no solution
- a unique solution
- many solutions
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The Correct Option is B
Solution and Explanation
Step 1: Analyze the given equation.
\[ \left|\frac{dy}{dx}\right|+|y|+3=0 \]
Step 2: Use property of modulus.
For any real number \(u\):
\[ |u|\ge 0 \]
So:
\[ \left|\frac{dy}{dx}\right|\ge 0,\quad |y|\ge 0 \]
Step 3: Minimum possible value of LHS.
\[ \left|\frac{dy}{dx}\right|+|y|+3 \ge 0+0+3=3 \]
Step 4: Can it ever be 0?
No, because LHS is always \(\ge 3\).
So equation cannot be satisfied for any \(y(x)\).
Final Answer:
\[ \boxed{\text{No solution}} \]
\[ \left|\frac{dy}{dx}\right|+|y|+3=0 \]
Step 2: Use property of modulus.
For any real number \(u\):
\[ |u|\ge 0 \]
So:
\[ \left|\frac{dy}{dx}\right|\ge 0,\quad |y|\ge 0 \]
Step 3: Minimum possible value of LHS.
\[ \left|\frac{dy}{dx}\right|+|y|+3 \ge 0+0+3=3 \]
Step 4: Can it ever be 0?
No, because LHS is always \(\ge 3\).
So equation cannot be satisfied for any \(y(x)\).
Final Answer:
\[ \boxed{\text{No solution}} \]
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