Prove \(f(x)=4x^3+7\) is a Bijection
📺 Video Explanation
📝 Question
Show that:
\[ f:\mathbb{R}\to\mathbb{R},\quad f(x)=4x^3+7 \]
is a bijection.
✅ Solution
🔹 Step 1: Prove One-One (Injective)
Assume:
\[ f(x_1)=f(x_2) \]
Then:
\[ 4x_1^3+7=4x_2^3+7 \]
Simplify:
\[ x_1^3=x_2^3 \]
Since cube function is strictly increasing:
\[ x_1=x_2 \]
✔ Hence, \(f\) is one-one.
🔹 Step 2: Prove Onto (Surjective)
Let:
\[ y\in\mathbb{R} \]
Need to find:
\[ x\in\mathbb{R} \]
such that:
\[ 4x^3+7=y \]
Solve:
\[ 4x^3=y-7 \]
\[ x^3=\frac{y-7}{4} \]
\[ x=\sqrt[3]{\frac{y-7}{4}} \]
Since cube root exists for every real number:
\[ x\in\mathbb{R} \]
✔ Hence, onto.
🎯 Final Answer
\[ \boxed{f(x)=4x^3+7\text{ is bijective}} \]
🚀 Exam Shortcut
- Odd degree cubic functions are strictly increasing
- Use inverse form to prove onto
- One-one + onto = bijection