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15 November, 15:48

What's the tenth term of a sequence with an explicit rule of ƒ (n) = 2 + (-3) (n - 1) ?

Question 2 options:

A)

ƒ (10) = - 25

B)

ƒ (10) = 27

C)

ƒ (10) = - 30

D)

ƒ (10) = 32

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Answers (1)
  1. 15 November, 16:51
    0
    F (10) = - 25

    Step-by-step explanation:

    To solve an explicit rule, we have to understand every terms in its formula. For a given equation,

    F (n) = F (1) + d (n - 1)

    Where F (n) = the nth term of the sequence

    F (1) = first term

    d = common difference

    (n - 1) = one term less than the nth term

    Note : the above explicit sequence is for arithmetic function.

    From the above equation,

    F (n) = F (10)

    F (1) = 2

    d = - 3

    (n - 1) = (n - 1)

    To solve for the 10th term

    F (10) = 2 + (-3) (10 - 1)

    F (10) = 2 + (-3) (9)

    F (10) = 2 + (-27)

    F (10) = - 25

    The 10th term of the sequence is - 25
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