Aidanmajor02idn
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Find the rule.

pattern:

[|(-1)|; |(0)|; |(1)| ; |(m)|; |(3)|]
[|(-3)|; |(-1)|; |(1)| ; |(3)|; |(n)|]


write down the rule in the form y= ...​

Sagot :

Xero099idn

The first series uses a linear function with - 1 as first element and 1 as common difference, then the rule corresponding to the series is y = |- 1 + x|.

The second series uses a linear function with - 3 as second element as 2 as common difference, then the rule corresponding to the series is y = |- 3 + 2 · x|.

What is the pattern and the function behind a given series?

In this problem we have two cases of arithmetic series, which are sets of elements generated by a condition in the form of linear function and inside absolute power. Linear functions used in these series are of the form:

y = a + r · x      (1)

Where:

  • a - Value of the first element of the series.
  • r - Common difference between two consecutive numbers of the series.
  • x - Index of the element of the series.

The first series uses a linear function with - 1 as first element and 1 as common difference, then the rule corresponding to the series is y = |- 1 + x|.

The second series uses a linear function with - 3 as second element as 2 as common difference, then the rule corresponding to the series is y = |- 3 + 2 · x|.

To learn more on series: https://brainly.com/question/15415793

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