Difference between revisions of "Manuals/calci/CONFIDENCE"

Latest revision as of 16:20, 7 August 2018

CONFIDENCE (Alpha,StandardDeviation,Size)

$Alpha$ is alpha value which is indicating the significance level.
$StandardDeviation$ is the value of the standard deviation.
is the size of the sample.
- CONFIDENCE(), returns the confidence interval for a population mean.

Description

This function gives value of the confidence intervals.
Confidence intervals are calculated based on the standard error of a measurement.
It is measures the probability that a population parameter will fall between lower bound and upper bound of the values.
There are four steps to constructing a confidence interval.

   1. Identify a sample statistic.
   2. Select a confidence level. 
   3. Find the margin of error.
   4. Specify the confidence interval.

Normally once standard error value is calculated, the confidence interval is determined by multiplying the standard error by a constant that reflects the level of significance desired, based on the normal distribution.
In $CONFIDENCE(Alpha,StandardDeviation,Size)$ , $Alpha$ is the alpha value which is indicating the significance level used to find the value of the confidence level.
It equals $100*(1-Alpha)\%$ , or alpha of 0.05 indicates a 95 percent confidence level.
This value is $\pm$ 1.96
$StandardDeviation$ is the standard deviation of the population for the data range.
$Size$ is the size of the sample.
Confidence interval is calculated using the following formula:

     $Confidenceinterval=samplestatistic+Marginoferror$ .

So $confidenceinterval={\bar {x}}\pm 1.96({\frac {\sigma }{\sqrt {s}}})$
where ${\bar {x}}$ is the sample mean,sigma is the standard deviation.
This function will give the result as error when

 1. Any one of the argument is nonnumeric. 
 2.Suppose  $0\leq Alpha\leq 1$ 
 3. value of s is less than 1.

Suppose with the population of 10 for the standard deviation 3.2, with the alpha value 0.2 then, CONFIDENCE(0.2,3.2,10) =1.296839.
So the Confidence interval value is $10\pm 1.296839=approximately[11.29,8.70]$ .

ZOS

The syntax is to calculate CONFIDENCE in ZOS is .
- $Alpha$ is value of the significance level.
$Size$ is the size of the sample.
For e.g., CONFIDENCE(0.2,3.1,20)
CONFIDENCE(0.67,8.3..10.3,51)

Examples

=CONFIDENCE(0.6,4.6,20) = 0.539393789
=CONFIDENCE(0.09,8.1,25) = 2.746544290
=CONFIDENCE(0.001,18.8,50) = 8.74859415

References

CONFIDENCE

List of Main Z Functions

Z3 home

@@ Line 1: / Line 1: @@
-<div style="font-size:30px">'''CONFIDENCE(a,sd,s)'''</div><br/>
+<div style="font-size:30px">'''CONFIDENCE (Alpha,StandardDeviation,Size)'''</div><br/>
-*<math>a</math>  is alpha value which is indicating the significance level.
+*<math>Alpha</math>  is alpha value which is indicating the significance level.
-*<math>sd</math> is the standard deviation.
+*<math>StandardDeviation</math> is the value of the standard deviation.
-*<math>s</math> is the size of the sample.
+*<math>Size</math> is the size of the sample.
+**CONFIDENCE(), returns the confidence interval for a population mean.
@@ Line 15: / Line 16: @@
 . Specify the confidence interval.
 *Normally once standard error value is calculated, the confidence interval is determined by multiplying the standard error by a constant that reflects the level of significance desired, based on the normal distribution.
-*In <math>CONFIDENCE(a,sd,s)</math> , <math>a</math> is the alpha value which is indicating the significance level used to find the value of the confidence level.
+*In <math>CONFIDENCE (Alpha,StandardDeviation,Size)</math> , <math>Alpha</math> is the alpha value which is indicating the significance level used to find the value of the confidence level.
-*It equals <math>100*(1-alpha)%</math>, or alpha of 0.05 indicates a 95 percent confidence level.
+*It equals <math>100*(1-Alpha)%</math>, or alpha of 0.05 indicates a 95 percent confidence level.
-*This value is <math> \plusmn</math> {1.96}
+*This value is <math> \pm </math> 1.96
-*<math> sd </math> is the standard deviation of the population for the data range.
+*<math> StandardDeviation </math> is the standard deviation of the population for the data range.
-*<math> s </math> is the size of the sample.
+*<math> Size </math> is the size of the sample.
 *Confidence interval is calculated using the following formula:
       <math>Confidence interval = sample statistic + Margin of error</math>.
-*So  <math> confidence interval =\bar{x}\plusmn {1.96}(\frac{\sigma}{\sqrt {s}})</math>
+*So  <math> confidence interval =\bar{x}\pm 1.96(\frac{\sigma}{\sqrt {s}})</math>
 *where <math>\bar{x}</math> is the sample mean,sigma is the standard deviation.
 *This function will give the result as error when
 . Any one of the argument is nonnumeric.
-.Suppose <math>0\le alpha\le1 </math>
+.Suppose <math>0\le Alpha\le1 </math>
 . value of s is less than 1.
 *Suppose with the population of 10 for the standard deviation 3.2, with the alpha value 0.2 then, CONFIDENCE(0.2,3.2,10) =1.296839.
-*So the Confidence interval value is <math> 10\plusmn 1.296839= approximately[11.29,8.70]</math>.
+*So the Confidence interval value is <math> 10\pm 1.296839= approximately[11.29,8.70]</math>.
+==ZOS==
+*The syntax is to calculate CONFIDENCE in ZOS is <math>CONFIDENCE (Alpha,StandardDeviation,Size)</math>.
+**<math>Alpha</math>  is  value of the significance level.
+*<math>Size</math> is the size of the sample.
+*For e.g., CONFIDENCE(0.2,3.1,20)
+*CONFIDENCE(0.67,8.3..10.3,51)
 ==Examples==
@@ Line 36: / Line 45: @@
 #=CONFIDENCE(0.001,18.8,50) = 8.74859415
+==Related Videos==
+{{#ev:youtube|siqx4PbqJ6s|280|center|CONFIDENCE}}
 ==See Also==
@@ Line 43: / Line 56: @@
 ==References==
-*<math>\pm</math>
+[http://en.wikipedia.org/wiki/Confidence_interval CONFIDENCE]
-*<math>\sigma</math>
+*[[Z_API_Functions | List of Main Z Functions]]
+*[[ Z3 |   Z3 home ]]

Difference between revisions of "Manuals/calci/CONFIDENCE"

Latest revision as of 16:20, 7 August 2018

Contents

Description

ZOS

Examples

Related Videos

See Also

References

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