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19 March, 21:15

What is the sum of the arithmetic sequence 3,9,15 if there are 34 terms

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  1. 19 March, 21:40
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    First we find the common difference ... do this by subtracting the first term from the second term. (9 - 3 = 6) ... so basically, ur adding 6 to every number to find the next number.

    we will be using 2 formulas ... first, we need to find the 34th term (because we need this term for the sum formula)

    an = a1 + (n-1) * d

    n = the term we want to find = 34

    a1 = first term = 3

    d = common difference = 6

    now we sub

    a34 = 3 + (34-1) * 6

    a34 = 3 + (33 * 6)

    a34 = 3 + 198

    a34 = 201

    now we use the sum formula

    Sn = (n (a1 + an)) / 2

    S34 = (34 (3 + 201)) / 2

    s34 = (34 (204)) / 2

    s34 = 6936/2

    s34 = 3468 < = = = the sum of the first 34 terms
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