Find \(f(x)\)
🎥 Video Explanation
📝 Question
Given:
\[ g(x)=x^2+x-2 \]
\[ \frac{1}{2}g(f(x))=2x^2-5x+2 \]
Find \(f(x)\).
✅ Solution
🔹 Step 1: Remove Fraction
\[ g(f(x))=4x^2-10x+4 \] —
🔹 Step 2: Substitute \(g(x)\)
\[ (f(x))^2 + f(x) -2 = 4x^2-10x+4 \] —
🔹 Step 3: Rearrange
\[ (f(x))^2 + f(x) – (4x^2-10x+6)=0 \] —
🔹 Step 4: Factor
Observe:
\[ 4x^2-10x+6=(2x-2)(2x-3) \]
So:
\[ (f(x))^2 + f(x) – (2x-2)(2x-3)=0 \]
Factor:
\[ (f(x)-(2x-2))(f(x)+(2x-3))=0 \] —
🔹 Step 5: Solve
\[ f(x)=2x-2 \quad \text{or} \quad f(x)=-2x+3 \] —
🔹 Final Answer
\[ \boxed{f(x)=2x-2 \text{ or } f(x)=3-2x} \]