Product of Two One-One Functions Need Not Be One-One
📺 Video Explanation
📝 Question
Show that if:
\[ f_1,f_2:\mathbb{R}\to\mathbb{R} \]
are one-one, then:
\[ (f_1\times f_2)(x)=f_1(x)f_2(x) \]
need not be one-one.
✅ Solution
Take:
\[ f_1(x)=x \]
and:
\[ f_2(x)=\frac{1}{x},\quad x\neq0 \]
(Or restrict domain excluding 0.)
🔹 Check \(f_1\)
Function:
\[ f_1(x)=x \]
is one-one.
✔ One-one.
🔹 Check \(f_2\)
Function:
\[ f_2(x)=\frac1x \]
is also one-one on:
\[ \mathbb{R}\setminus\{0\} \]
✔ One-one.
🔹 Product Function
Now:
\[ (f_1\times f_2)(x)=x\cdot\frac1x=1 \]
for all:
\[ x\neq0 \]
This is constant.
Constant function is not one-one.
❌ Hence product need not be one-one.
🎯 Final Answer
Example:
\[ \boxed{f_1(x)=x,\quad f_2(x)=\frac1x} \]
Then:
\[ (f_1\times f_2)(x)=1 \]
which is not one-one.
🚀 Exam Shortcut
- Choose inverse-type functions
- Product becomes constant
- Constant ⇒ not injective