![]() So, we have come up with simple tricks and steps to solve the finite geometric progression. Hence, the geometric sequence is įinding the sum of the Geometric sequence can be quite difficult. Pick any of them and solve the problems of geometric sequence effortlessly.įind the geometric sequence up to 7 terms if first term(a) = 5, and common ratio(r) = 2. Finally, you have seen two ways to find the terms of GP.The other way to find the various terms in a GP is by substituting the value of n in ar n-1.Keep multiplying the common ratio with the prior term & find the required number of terms. To find the second term, multiply 'a' with the common ratio 'r' a × r.The detailed steps that you need to focus & follow while finding the terms of a GP are listed below: = ar n-1/ar n-2 How to Find the Terms of Geometric Progression? Let's consider the geometric series is a, ar, ar 2, ar 3.Ĭommon Ratio(r) = (Any Term) / (Preceding Term) ![]() Therefore, the kth item at the end of the geometric series will be ar n-k. ![]()
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