Check Function \(f(x)=x^3\) on \( \mathbb{Z} \)
📺 Video Explanation
📝 Question
Check whether the function
\[ f:\mathbb{Z}\to\mathbb{Z},\quad f(x)=x^3 \]
is:
- injection (one-one)
- surjection (onto)
- bijection
✅ Solution
🔹 Step 1: Check Injection (One-One)
Assume:
\[ f(x_1)=f(x_2) \]
Then:
\[ x_1^3=x_2^3 \]
Cube function is strictly increasing on integers.
So:
\[ x_1=x_2 \]
✔ Hence, function is one-one.
🔹 Step 2: Check Surjection (Onto)
For onto, every integer must have pre-image.
But:
\[ 2\in\mathbb{Z} \]
There is no integer \(x\) such that:
\[ x^3=2 \]
So:
\[ 2 \] is not in range.
❌ Hence, function is not onto.
🎯 Final Answer
\[ \boxed{\text{f is one-one but not onto}} \]
So:
✔ Injection
❌ Surjection
❌ Bijection
🚀 Exam Shortcut
- Cube function is strictly increasing → injective
- Only perfect cubes appear in range
- Missing integers mean not onto