Evaluate \((f^{-1}\circ f)(1)+\cdots+(f^{-1}\circ f)(100)\)
📝 Question
Let \(f\) be an invertible real function. Evaluate:
\[ (f^{-1}\circ f)(1) +(f^{-1}\circ f)(2)+ \cdots +(f^{-1}\circ f)(100) \]
✅ Solution
🔹 Step 1: Use identity property
For an invertible function:
\[ (f^{-1}\circ f)(x)=x \] —
🔹 Step 2: Apply to each term
\[ (f^{-1}\circ f)(1)=1,\quad (f^{-1}\circ f)(2)=2,\ \ldots,\ (f^{-1}\circ f)(100)=100 \] —
🔹 Step 3: Sum the series
\[ 1+2+3+\cdots+100 \] :contentReference[oaicite:0]{index=0} —
🎯 Final Answer
\[ \boxed{5050} \]
🚀 Exam Shortcut
- \(f^{-1}(f(x))=x\)
- Reduce problem to sum of first 100 natural numbers
- Use formula: \(\frac{n(n+1)}{2}\)