This problem has several items. So, let's solve it step by step.
1. Compare the graphs of the logarithmic functions f(x)=log7x and g(x)=log4x.
In the Figure below, we have tha graph of the two functions. The graph in red is [tex]f(x)=log(7x)[/tex] and the graph in blue is [tex]g(x)=log(4x)[/tex]. The x-intercept of [tex]f[/tex] is:
[tex]y=log(7x) \\ \\ 0=log(7x) \\ \\ 10^{0}=10^{log(7x)} \\ \\ 1=7x \\ \\ x=\frac{1}{7}=0.14[/tex]
On the other hand, the x-intercept of [tex]g[/tex] is:
[tex]y=log(4x) \\ \\ 0=log(4x) \\ \\ 10^{0}=10^{log(4x)} \\ \\ 1=4x \\ \\ x=\frac{1}{4}=0.25[/tex]
Each graph begins in the fourth quadrant and is increasing quickly. As the graph crosses the x-axis at each x-intercept, each graph does not increase as fast. The graph continues to increase slowly throughout the first quadrant.
2. For what values of x is f=g
We can find this answer by taking this equation:
[tex]f(x)=g(x) \\ \\ log(7x)=log(4x) \\ \\ 10^{log(7x)}=10^{log(4x)} \\ \\ 7x=4x \\ \\ 7=4[/tex]
As you can see this is an absurd result since 7 is not equal to 4. The conclusion is that the function [tex]f[/tex] is always different from [tex]g[/tex], that is, [tex]f\neq g \ always![/tex]
3. For what values f>g
From the graph, we can see that the red function is always greater than the blue function. Therefore, [tex]f>g \ Always![/tex]
