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Geometric Progression (G.P.) is a geometric sequence where each successive term is the result of multiplying a constant number to its preceding term. Learn Nth term, sum of G.P. with examples at BYJU'S.
In geometric progression (G.P.), the sequence is geometric and is a result of the sum of G.P. A geometric series is the sum of all the terms of geometric sequence. Before going to learn how to find the sum of a given Geometric Progression, first know what a GP is in detail. What is Geometric Progression?
A geometric progression (GP) is a progression the ratio of any term and its previous term is equal to a fixed constant. It is a special type of progression.
Class 10 and 11 students can practise the questions based on geometric progression to prepare for the exams. These geometric progression problems are prepared by our subject experts, as per the NCERT curriculum and latest CBSE syllabus (2022-2023). Learn more: Geometric Progression.
May 28, 2024 · A geometric progression (GP) is a sequence of numbers where each term after the first is found by multiplying the previous term by a fixed, non-zero number called the common ratio. The nth term of the Geometric series is denoted by an and the elements of the sequence are written as a1, a2, a3, a4, …, an.
A geometric progression is a sequence in which any element after the first is obtained by multiplying the preceding element by a constant called the common ratio which is denoted by r. For example, the sequence 1, 2, 4, 8, 16, 32… is a geometric sequence with a common ratio of r = 2.
The sum of GP for finite terms is a(r^n-1)/(r-1) when r ≠ 1. If r = 1, then the sum turns out to be na. The sum of infinite terms f GP is a/(1-r) when |r| < 1, otherwise, the sum does not exist. Learn more about GP sum along with examples.
