TESTE DA INTEGRAL PARA SÉRIES

In this lesson, we present the integral test to study the convergence of numerical series. We show in detail when we can use the integral test. As an application, we study the convergence of p-series. In fact, we show that the harmonic series is divergent, that is, when p=1. We also observe that when the series does not start to add at n=1, the value of the lower limit of the improper integral must be the index from where the sum of the series begins. The integral test is applied to series of positive terms. This test is conclusive. If the improper integral converges, the series converges. If the improper integral diverges, the series diverges. Class Notes: https://sites.google.com/view/botefen... Questions Group: https://chat.whatsapp.com/CspwfPFNqo7...