For what values of xxx does the power series ∑n=0∞(x−2)n\sum_{n=0}^{\infty} (x-2)^n∑n=0∞(x−2)n converge?
∣x−2∣<1|x-2| < 1∣x−2∣<1
∣x−2∣≤1|x-2| \leq 1∣x−2∣≤1
∣x∣<2|x| < 2∣x∣<2
x>3x > 3x>3