Low-central-high confidence interval triplet for the nanflow bin, given a confidence interval function.
Low-central-high confidence interval triplet for the nanflow bin, given a confidence interval function.
confidence interval function, which takes (numerator entries, denominator entries, z
) as arguments, where z
is the "number of sigmas:" z = 0
is the central value, z = -1
is the 68% confidence level below the central value, and z = 1
is the 68% confidence level above the central value.
absolute value of z
to evaluate.
confidence interval evaluated at (-absz, 0, absz)
.
Low-central-high confidence interval triplet for the overflow bin, given a confidence interval function.
Low-central-high confidence interval triplet for the overflow bin, given a confidence interval function.
confidence interval function, which takes (numerator entries, denominator entries, z
) as arguments, where z
is the "number of sigmas:" z = 0
is the central value, z = -1
is the 68% confidence level below the central value, and z = 1
is the 68% confidence level above the central value.
absolute value of z
to evaluate.
confidence interval evaluated at (-absz, 0, absz)
.
Low-central-high confidence interval triplet for the overflow bin, given a confidence interval function.
Low-central-high confidence interval triplet for the overflow bin, given a confidence interval function.
confidence interval function, which takes (numerator entries, denominator entries, z
) as arguments, where z
is the "number of sigmas:" z = 0
is the central value, z = -1
is the 68% confidence level below the central value, and z = 1
is the 68% confidence level above the central value.
absolute value of z
to evaluate.
confidence interval evaluated at (-absz, 0, absz)
.
Low-central-high confidence interval triplet for all bins, given a confidence interval function.
Low-central-high confidence interval triplet for all bins, given a confidence interval function.
confidence interval function, which takes (numerator entries, denominator entries, z
) as arguments, where z
is the "number of sigmas:" z = 0
is the central value, z = -1
is the 68% confidence level below the central value, and z = 1
is the 68% confidence level above the central value.
absolute value of z
to evaluate.
confidence interval evaluated at (-absz, 0, absz)
.
Nanflow fraction as a number.
Overflow fraction as a number.
Underflow fraction as a number.
Bin fractions as numbers.
Methods that are implicitly added to container combinations that look like fractioned histograms.