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28 September, 15:14

a term in an arithmetic sequence is 488. the first term of the sequence is 7 and the common difference is 13. find the term number.

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  1. 28 September, 15:22
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    Answer: the term number is 38

    Step-by-step explanation:

    Let the number of the term be x

    The value of the xth term = 488

    In an arithmetic sequence, the terms differ by a common difference, d. This means that the difference between two consecutive terms, d is constant.

    The formula for the nth term is

    Tn = a + (n-1) d

    Where

    Tn = the nth term of the arithmetic sequence

    a = the first term of the arithmetic sequence.

    d = common difference.

    From the information given,

    a = 7

    d = 13

    We are looking for the xth term.

    Tx = 488 = 7 + (x-1) 13

    488 = 7 + 13x - 13

    Collecting like terms on the left hand side and right hand side of the equation,

    13x = 488 - 7 + 13

    13x = 494

    x = 38

    The value of the 38th term is 488.
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