Determine Nature of \(f(x)=x+\sqrt{x^2}\)
📝 Question
Let:
\[ f:\mathbb{R}\to\mathbb{R}, \quad f(x)=x+\sqrt{x^2} \]
Determine whether \(f\) is one-one, many-one, onto or into.
✅ Solution
🔹 Step 1: Simplify function
We know:
:contentReference[oaicite:0]{index=0}So,
\[ f(x)=x+|x| \] —
🔹 Step 2: Consider cases
Case 1: \(x \ge 0\)
\[ f(x)=x+x=2x \]
Case 2: \(x < 0\)
\[ f(x)=x-x=0 \] —
🔹 Step 3: Check one-one / many-one
For all \(x<0\), \(f(x)=0\).
Different inputs give same output.
Hence, \(f\) is many-one.
—🔹 Step 4: Find range
From above:
- \(x<0 \Rightarrow f(x)=0\)
- \(x\ge0 \Rightarrow f(x)=2x \ge 0\)
So range is:
\[ [0,\infty) \] —
🔹 Step 5: Check onto / into
Codomain is \(\mathbb{R}\), but range is \([0,\infty)\).
Negative values are not obtained.
Hence, function is into (not onto).
—🎯 Final Answer
\[ \boxed{\text{f is many-one and into}} \]
🚀 Exam Shortcut
- Replace \(\sqrt{x^2}\) with \(|x|\)
- Split into cases: \(x\ge0\), \(x<0\)
- Same output for many inputs ⇒ many-one
- Range ≠ codomain ⇒ into