Solved: In 27 and 28, functions f and g are defined. In each case draw the graphs of f

Chapter 11, Problem 27

(choose chapter or problem)

In 27 and 28 , functions f and g are defined. In each case draw the graphs of f and 2g on the same set of axes and find a number \(x_{0}\) so that \(f(x) \leq 2 g(x)\) for all \(x>x_{0}\). You can find an exact value for \(x_{0}\) by solving a quadratic equation, or you can find an approximate value for \(x_{0}\) by using a graphing calculator.

\(f(x)=x^{2}+10 x+11\) and \(g(x)=x^{2}\) for all real numbers \(x \geq 0\)

Text Transcription:

x_0

f(x) \leq 2 g(x)

x>x_0

f(x)=x^2+10 x+11

g(x)=x^2

x geq 0