Use the various properties of exponential and logarithmic functions to evaluate the expressions in parts (a)–(c). Given ƒ(x) = 3^x, find ƒ(log_3 2)

Exponential functions are mathematical expressions in the form ƒ(x) = a^x, where 'a' is a positive constant and 'x' is the variable exponent. These functions exhibit rapid growth or decay, depending on the base 'a'. Understanding their properties, such as the behavior of the function as 'x' approaches positive or negative infinity, is crucial for evaluating expressions involving exponents.

Logarithmic functions are the inverse of exponential functions and are expressed as log_b(a) = c, meaning b^c = a. They help in solving equations where the variable is an exponent. The properties of logarithms, such as the product, quotient, and power rules, are essential for manipulating and simplifying logarithmic expressions, particularly when evaluating logarithms of different bases.

The change of base formula allows us to convert logarithms from one base to another, expressed as log_b(a) = log_k(a) / log_k(b) for any positive base 'k'. This is particularly useful when dealing with logarithms of bases that are not easily computable. In the context of the given problem, applying this formula can simplify the evaluation of ƒ(log_3 2) by converting it into a more manageable form.