We have to functions, namely:
[tex]f(x)=200(2)^{x} \ and \ g(x)=500x+400[/tex]
So the problem is asking for the smallest positive integer for [tex]x[/tex] so that [tex]f(x)[/tex] is greater than the value of [tex]g(x)[/tex], that is:
[tex]f(x)\ \textgreater \ g(x) \\ \therefore 200(2)^{x}\ \textgreater \ 500x+400[/tex]
Let's solve this problem by using the trial and error method:
[tex]for \ x=1 \\f(1)=400 \\ g(1)=900 \\ Then \ f(1) \ \textless \ g(1) \\ \\ \\ for \ x=2 \\f(2)=800 \\ g(2)=1400\\ Then \ f(2)\ \textless \ g(2) \\ \\ \\ for \ x=3 \\f(3)=1600 \\ g(3)=1900 \\ Then \ f(3)\ \textless \ g(3) \\ \\ \\ for \ x=4 \\f(4)=3200 \\ g(4)=2400 \\ \boxed{Then \ f(4)\ \textgreater \ g(4)}[/tex]
So starting [tex]x[/tex] from 1 and increasing it in steps of one we find that:
[tex]f(x)>g(x)[/tex]
when [tex]x=4[/tex]
That is, the smallest positive integer for [tex]x[/tex] so that the function [tex]f(x)[/tex] is greater than [tex]g(x)[/tex] is 4.
