Answer:
False
Step-by-step explanation:
Actually, the arithmetic average (or mean) is always greater or equal than the geometric average. This is known as the Arithmetic-Geometric inequality (AM inequality). Let a,b be two real numbers, then the AM inequality states that
[tex]\frac{a+b}{2}\geq \sqrt{ab}[/tex]
To see that the given statement is false, consider a=1, b=3. The arithmetic mean is equal to (1+3)/2=2, and the geometric mean is equal to [tex]\sqrt{1\cdot 3}=\sqrt{3}[/tex] but [tex]2>\sqrt{3}[/tex], contrary to the statement (arithmetic>geometric in this case).
