Section 13.6 – Absolute Convergence

The series converges absolutely The series contains negative terms, so we must look at absolute convergence. The series converges absolutely (p-series p = 2) The series contains negative terms, so we must look at absolute convergence.

The series contains negative terms, so we must look at absolute convergence.

The series contains negative terms, so we must look at absolute convergence. The series contains negative terms, so we must look at absolute convergence.

The series contains negative terms, so we must look at absolute convergence. The series contains negative terms, so we must look at absolute convergence.

The series contains negative terms, so we must look at absolute convergence.

The series contains negative terms, so we must look at absolute convergence.

The series contains negative terms, so we must look at absolute convergence.

The series contains negative terms, so we must look at absolute convergence. The series contains negative terms, so we must look at absolute convergence.