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16 April, 02:59

What is the sum of the first six terms of the geometric series?

2 - 6 + 18 - 54 + ...

-486

-364

-40

122

+2
Answers (1)
  1. 16 April, 06:08
    0
    This may be done manually by identifying the next two terms of the sequence. To do so, identify first the common ratio of the geometric sequence.

    common ratio, r = (-6 / 2) = - 3

    The next two terms are

    a5 = (-54) (-3) = 162

    a6 = (162) (-3) = - 486

    Solve for the sum of the first six terms

    S = 2 - 6 + 18 - 54 + 162 - 486 = - 364

    Thus, the answer is - 364 which is the second among the choices.
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