﻿ CFrequencyTableBOR(String,Series,Double[]) Method
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 dotnetCHARTING Namespace > StatisticalEngine Class > CFrequencyTableBOR Method : CFrequencyTableBOR(String,Series,Double[]) Method

seriesName
The name of the series which will be displayed on the chart, i.e. its label.
s
A statistical series.
boundaries
A strictly increasing sequence of boundaries of the intervals over the real line in which the data sets point will be assigned.
Calculates the cumulative frequency table from below for a discrete data set in accordance with the open right boundary (ORB) convention.

# Syntax

Visual Basic (Declaration)
```Public Overloads Shared Function CFrequencyTableBOR( _
ByVal seriesName As String, _
ByVal s As Series, _
ByVal boundaries() As Double _
) As Series```
Visual Basic (Usage)Copy Code
``````Dim seriesName As String
Dim s As Series
Dim boundaries() As Double
Dim value As Series

value = StatisticalEngine.CFrequencyTableBOR(seriesName, s, boundaries)``````
C#
```public static Series CFrequencyTableBOR(
string seriesName,
Series s,
double[] boundaries
)```

#### Parameters

seriesName
The name of the series which will be displayed on the chart, i.e. its label.
s
A statistical series.
boundaries
A strictly increasing sequence of boundaries of the intervals over the real line in which the data sets point will be assigned.

# Remarks

The value of the cumulative frequency table values at a given point is the number of elements within the data set below the highest value of that interval of the frequency table constructed in accordance with the open right boundary convention.

#### Example

Within this example we work through an illustration in which the cumulative frequency table from below using the open right boundary convention is evaluated.

Consider the set of boundaries `{ 1, 2, 3, 4, 5 }`, which divide the real line into six sub-intervals. Now if we use the open right boundary convention then the real line will be divided into the sub-intervals:

(-infinity, 1), [1, 2), [2, 3), [3, 4), [4, 5), [5, infinity)

Note that, each point on the real line can be assigned to one of these sub-intervals and therefore when assigning a data point to one of these intervals there will only be one sub-interval in which it belongs.

Therefore, if we consider the data set `{ 0.5, 1.4, 1.3, 2.0, 2.3, 4.5, 5.5}`, if the assign this data set in accordance with the above the conventions then we will have using Open Right Boundary (ORB) convention:

• Within the interval `(-infinity, 1]`, we assign the data element `0.5`; and hence the frequency of this interval is `1`.
• Within the interval `[1, 2)`, we assign the data element `1.4, 1.3`; and hence the frequency of this interval (wrt ORB convention) is `2`.
• Within the interval `[2, 3)`, we assign the data element `2.0, 2.3`; and hence the frequency of this interval (wrt ORB convention) is `2`.
• Within the interval `[3, 4)`, we assign no data elements, and hence the frequency of this interval (wrt ORB convention) is `0`.
• Within the interval `[4, 5)`, we assign the data element `4.5`, and hence the frequency of this interval (wrt ORB convention) is `1`.
• Within the interval `[5, infinity)`, we assign the data element `5.5`, and hence the frequency of this interval (wrt ORB convention) is `1`.

Now in follows that the associated values of the cumulative frequency table are given by:

• Cumulative frequency table up to `1` is: `1`
• Cumulative frequency table up to `2` is: `3`
• Cumulative frequency table up to `3` is: `5`
• Cumulative frequency table up to `4` is: `5`
• Cumulative frequency table up to `5` is: `6`
• Cumulative frequency table up to `5` is: `7`

Hence, for this case the series returned by this methods to represent the cumulative frequency table would be: `{1, 3, 5, 5, 6, 7}`.