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11 January, 13:47

Which sequence could be partially defined by the recursive formula f (n + 1) = f (n) + 2.5 for n 2 1?

2.5, 6.25, 15.625, 39.0625, ...

2.5, 5, 10, 20

-10,-7.5, - 5, - 2.5, ...

-10, - 25, 62.5, 156.25

+1
Answers (1)
  1. 11 January, 14:05
    0
    Sequence 3

    -10,-7.5,-5,-2.5, ...

    Step-by-step explanation:

    So f (n+1) = f (n) + 2.5 means a term can be found by adding it's previous term to 2.5. That means this is an arithmetic sequence with a common difference of 2.5.

    f (n+1) = f (n) + d is the recursive form for an arithmetic sequence with common difference d.

    So you are looking for a sequence of numbers that is going up by 2.5 each time.

    Let's check sequence 1:

    2.5+2.5=5 so not this one because we didn't get 6.25 next.

    Let's check sequence 2:

    2.5+2.5=5 is what we have for the 2nd term.

    5+2.5=7.5 so not this one because we didn't get 10 next.

    Let's check sequence 3:

    -10+2.5=-7.5 is the 2nd term

    -7.5+2.5=-5 is the 3rd term

    -5+2.5=-2.5 is the 4th term

    Sequence 3 is arithmetic with common difference 2.5 assuming the pattern continues.

    Let's check sequence 4 for fun:

    -10+2.5=-7.5 is not - 25

    So we are done. Sequence 3 is the only one that fits term=previous term+2.5 or f (n+1) = f (n) + 2.5.
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Home » Mathematics » Which sequence could be partially defined by the recursive formula f (n + 1) = f (n) + 2.5 for n 2 1? 2.5, 6.25, 15.625, 39.0625, ... 2.5, 5, 10, 20 -10,-7.5, - 5, - 2.5, ... -10, - 25, 62.5, 156.25
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