The sequence formulas would tell how to find the n th term (or general term) of a sequence whereas the series formulas would tell us how to find the sum (series) of a sequence. What is the Difference Between Sequence and Series Formulas? Series formula for the sum of infinite terms The sequences and series formulas for different types are tabulated below: Arithmetic So it is possible to find its sum using one of the sequence and series formulas:Īnswer: Sum of all terms of the given series = 10/3.įAQs on Sequences and Series Formulas List some Important Sequences and Series Formulas. In the given geometric series, the common ratio, r = -1/2. In the given series, the first term is a = 1 and the common difference is d = 3.įor the sum of 100 terms, substitute n = 100: Learn the why behind math with our certified expertsīook a Free Trial Class Examples on Sequences and Series FormulasĮxample 1: Find the value of the 25 th term of the arithmetic sequence 5, 9, 13, 17.Īnswer: Hence the 25 th term of the series is 101.Įxample 2: Find the sum of the first 100 terms of the arithmetic series 1 + 4 + 7 +. Sum of the harmonic series, S n = 1/d ln īecome a problem-solving champ using logic, not rules.n th term of harmonic sequence, a n = 1 / (a + (n - 1) d)., where '1/a' is its first term and 'd' is the common difference of the arithmetic sequence a, a + d, a + 2d. Sum of infinite geometric series, S n = a / (1 - r) when |r| Sum of the finite geometric series (sum of first 'n' terms), S n = a (1 - r n) / (1- r).n th term of geometric sequence, a n = a r n - 1., where 'a' is the first term and 'r' is the common ratio. Sum of the arithmetic series, S n = n/2 (2a + (n - 1) d) (or) S n = n/2 (a + a n)Ĭonsider the geometric sequence a, ar, ar 2, ar 3.n th term of arithmetic sequence, a n = a + (n - 1) d. ![]() , where 'a' is its first term and 'd' is its common difference. ![]() Arithmetic Sequence and Series FormulasĬonsider the arithmetic sequence a, a+d, a+2d, a+3d, a+4d. Let us see each of these formulas in detail and understand what each variable represents. The figure below shows all sequences and series formulas. In a harmonic sequence, the reciprocals of its terms are in an arithmetic sequence. In a geometric sequence, there is a common ratio between consecutive terms. In an arithmetic sequence, there is a common difference between two subsequent terms.
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