drewfstr314 said:Our textbook defines an exponential function as
f(x) = ab^x. However, a question was brought up about a function, g(x) = 5^sqrt(x). Is g an exponential function? It looks like an exponential graph for x>0, but is not continuous on R.
An exponential function is a mathematical function in which the independent variable appears as an exponent. It is often written in the form f(x) = a^x, where a is a constant known as the base.
To determine if g(x)=5^sqrt(x) is an exponential function, we need to check if the independent variable, x, appears as an exponent. In this case, x appears as the exponent of the base 5, so yes, g(x) is an exponential function.
The domain of g(x)=5^sqrt(x) is all real numbers greater than or equal to 0. This is because the square root function can only take in non-negative values, and the base 5 can be raised to any power.
The range of g(x)=5^sqrt(x) is all real numbers greater than or equal to 1. This is because the base 5 can be raised to any power, and the square root function always gives a positive value, making the output of g(x) always greater than or equal to 1.
To graph g(x)=5^sqrt(x), you can first plot some points by choosing values for x and calculating the corresponding values of g(x). Then, connect the points with a smooth curve. You can also use a graphing calculator or computer software to graph the function accurately.