An exponential function is always continuous. Exponential functions have the form \( f(x) = a \cdot b^x \) (where \( a \) is a constant, \( b > 0 \), and \( b \neq 1 \)), and they are defined for all real numbers \( x \). This means they do not have any breaks or jumps in their graph.
An exponential function is always...
constant.
decreasing.
continuous.
discrete.
1 answer