![]() Common Ratio $$$\left(r\right) $$$: This is the factor by which we multiply a term to get the next term in the sequence.All subsequent terms are determined based on this value and the common ratio. First Term $$$\left(a_1\right) $$$: This is the starting point of the geometric sequence.$$$n $$$ indicates the position of the term in the sequence.$$$r $$$ is the common ratio, which is the fixed number we multiply by to get the next term.$$$a_1 $$$ represents the first term of the sequence.$$$a_n $$$ is the nth term of the sequence.The formula for the nth term of a geometric sequence is: $$a_n=a_1r^ $$ In essence, starting from the first term, every subsequent term in the series is the product of the previous term and this fixed ratio. Make sure to cross-check the output for accuracy.Ī geometric sequence is a particular kind of number series that has a consistent pattern facilitated by a fixed number known as the ratio. ![]() The calculator will promptly display either the desired term or the full sequence based on your inputs. Once you've entered the necessary data, click the "Calculate" button. This may include the first term of the sequence, the common ratio, and, if applicable, the specific term number you are seeking. How to Use the Geometric Sequence Calculator?īegin by inputting the known data. Our calculator handles the task in moments and with a few simple clicks, ensuring you receive the correct output immediately. ![]() The Geometric Sequence Calculator is your trusted companion for identifying a specific term or computing the full geometric sequence using your provided inputs.
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