Show that the Geometric series \sum_{n=1}^{\infty} r^{n-1}=1+r+r^2+r^3+r^4+…..,where r > 0 , is convergent if r < 1 and diverges if r ≥ 1 | Geometric Sequences
![Show that the Geometric series Σ r^n-1=1+r+r^1+r^2+r^3+r^4+…..,where r > 0 , is convergent if r < 1and diverges if r ≥ 1| Geometric series solved problems](https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgeCMrQkAxVzpkWUYquXyyhdP34kWRgGKG3KEmrWuQ5M7r5Hs5x1wP9IR2qVJorFstQ75oS4tuhBScPV_j2Sbv1bRh0wIIlCtXPt1OdSiDUC5KDWQweshaxGJf5cFlrH4yehJfSpCD09Llo4-bh-3pA4UQatqsHuvu9-zrMe_uIOweDFw15w0qtvMff/w578-h640/Show%20that%20the%20Geometric%20series.jpg)
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geometric series convergence
geometric series examples with solutions
Test The Following Series
\frac{1}{3}+\frac{1.2}{3.5}+\frac{1.2.3}{3.5.7}+...\infty