QUESTION 2 The graph of \( f \) is given by \( f(x)=3^{\prime} \) 2.1 Write down the asymptote of \( f \). 2.2 Determine the domain and range of \( t \) 2.3 Determine the equation of \( f^{-1} \) in the form \( y=\cdots \) 2.4 Sketch the graph of \( f \) and \( f^{-1} \) on the same set of axes. 2.5 (1) Write down the equation of \( g \) if \( g(x)=-f(x)+4 \) and describe the transformation.

**2.1 Asymptote of \( f \):** \( y = 0 \) **2.2 Domain and Range of \( f \):** - **Domain:** All real numbers (\( \mathbb{R} \)) - **Range:** Positive real numbers (\( (0, \infty) \)) **2.3 Equation of \( f^{-1} \):** \( y = \log_3 x \) **2.4 Sketch of \( f \) and \( f^{-1} \):** - \( f(x) = 3^x \) is an increasing exponential curve passing through \((0,1)\) and approaching \( y = 0 \) as \( x \to -\infty \). - \( f^{-1}(x) = \log_3 x \) is a logarithmic curve passing through \((1,0)\) with a vertical asymptote at \( x = 0 \). - Both graphs are reflections of each other across the line \( y = x \). **2.5 Equation of \( g \) and Its Transformation:** \( g(x) = -3^x + 4 \) *Transformation:* 1. Reflect \( f(x) = 3^x \) over the \( x \)-axis to get \( -3^x \). 2. Shift the reflected graph upward by 4 units to obtain \( g(x) = -3^x + 4 \).