![]() ![]() Here 1/(a + (n - 1)d) is the general term of the harmonic sequence and is the required explicit formula.Įxplicit formula for finding the n th term of harmonic sequence: a n = 1/(a + (n - 1)d) ![]() The terms of the harmonic sequence are 1/a, 1/(a + d), 1/(a + 2d), 1/(a + 3d). The harmonic sequence explicit formula is useful to easily find any term of the harmonic sequence without finding the other terms of the sequence. The explicit formula is also helpful to represent the entire sequence with a single formula. Generally, the n th term of the sequence represents the explicit formula. ) which can be uniquely represented using an explicit formula (a n = 2n). Let us consider a simple sequence of even numbers(2, 4, 6, 8. The above explicit formulas are helpful to find any term of the arithmetic sequence, geometric sequence, or harmonic sequence, by simply substituting the n values in the respective explicit formulas.
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