![The sum of the first three terms of a G.p is 13/12 and their product is -1 - Home Work Help - Learn CBSE Forum The sum of the first three terms of a G.p is 13/12 and their product is -1 - Home Work Help - Learn CBSE Forum](https://ask.learncbse.in/uploads/db3785/original/3X/5/6/56b9e5e462427014a272a56847810eae4cb5cb51.png)
The sum of the first three terms of a G.p is 13/12 and their product is -1 - Home Work Help - Learn CBSE Forum
If sum of the n terms of a G.P be S, their product P and the sum of their reciprocals R, the prove that P^2 = (S/R)^n - Sarthaks eConnect | Largest
![Show that the Ratio of the Sum of First N Terms of a Geometric Progression. to the Sum of Terms from (N + 1)^(Th) " to "(2n)^(Th) " Term is " 1/R^N - Show that the Ratio of the Sum of First N Terms of a Geometric Progression. to the Sum of Terms from (N + 1)^(Th) " to "(2n)^(Th) " Term is " 1/R^N -](https://www.shaalaa.com/images/_4:62ab8ae07fad48b3aa5d56780d3b76d0.png)
Show that the Ratio of the Sum of First N Terms of a Geometric Progression. to the Sum of Terms from (N + 1)^(Th) " to "(2n)^(Th) " Term is " 1/R^N -
![The Sum of Some Terms of G.P. is 315 Whose First Term and the Common Ratio Are 5 and 2, Respectively. Find the Last Term and the Number of Terms. - Mathematics | Shaalaa.com The Sum of Some Terms of G.P. is 315 Whose First Term and the Common Ratio Are 5 and 2, Respectively. Find the Last Term and the Number of Terms. - Mathematics | Shaalaa.com](https://www.shaalaa.com/images/_4:f33950aaada744c89884c39f78949d0c.png)
The Sum of Some Terms of G.P. is 315 Whose First Term and the Common Ratio Are 5 and 2, Respectively. Find the Last Term and the Number of Terms. - Mathematics | Shaalaa.com
![sequences and series - Find the common ratio, if the sum of first 8 terms in GP(geometric progression) is 5 times the sum of first 4 terms also in GP. - Mathematics Stack Exchange sequences and series - Find the common ratio, if the sum of first 8 terms in GP(geometric progression) is 5 times the sum of first 4 terms also in GP. - Mathematics Stack Exchange](https://i.stack.imgur.com/31Fa4.jpg)