Level:
Project ID:
1003171601
Accepted:
1
Clonable:
0
Easy:
0
Consider the function \( f \) given by \( f(x)=\frac12x+\frac32 \) and consider the line \( p \) that is parallel to the \( x \)-axis and intersects \( y \)-axis at the point \( \left[0;\frac12\right] \). Find the function \( g \) such that the graph of \( g \) is symmetric with the graph of \( f \) about the line \( p \).
\( g(x)=-\frac12x-\frac12 \)
\( g(x)=2x-\frac12 \)
\( g(x)=-\frac12x-\frac32 \)
\( g(x)=\frac12x-\frac32 \)