What is an Arithmetic Geometric Progression?
An Arithmetic Geometric Progression or simply AGP, is basically a combination of an Arithmetic Progression and a Geometric Progression as name indicates. Mathematically, an AGP is obtained by taking the product of each term of an AP with the corresponding term of a GP. That is, an AGP is of the form a1b1, a2b2, a3b3,... where a1, a2, a3,... is an AP and b1, b2, b3,... is a GP. If d is the common difference and a is the first term of the AP, and r is the common ratio of the GP then the nth term of the AGP will be (a + (n-1)d)(r^(n-1)).
How to Calculate Nth Term of Arithmetic Geometric Progression?
Nth Term of Arithmetic Geometric Progression calculator uses Nth Term of Progression = (First Term of Progression+((Index N of Progression-1)*Common Difference of Progression))*(Common Ratio of Progression^(Index N of Progression-1)) to calculate the Nth Term of Progression, The Nth Term of Arithmetic Geometric Progression formula defined as the term corresponding to the index or position n from the beginning in the given Arithmetic Geometric Progression. Nth Term of Progression is denoted by Tn symbol.
How to calculate Nth Term of Arithmetic Geometric Progression using this online calculator? To use this online calculator for Nth Term of Arithmetic Geometric Progression, enter First Term of Progression (a), Index N of Progression (n), Common Difference of Progression (d) & Common Ratio of Progression (r) and hit the calculate button. Here is how the Nth Term of Arithmetic Geometric Progression calculation can be explained with given input values -> 736 = (3+((6-1)*4))*(2^(6-1)).