ZTEST function
This article describes the formula syntax and usage of the ZTEST function in Microsoft Excel.
Returns the onetailed probabilityvalue of a ztest. For a given hypothesized population mean, μ0, ZTEST returns the probability that the sample mean would be greater than the average of observations in the data set (array) — that is, the observed sample mean.
To see how ZTEST can be used in a formula to compute a twotailed probability value, see "Remarks" below.
For more information about the new function, see Z.TEST function.
Syntax
ZTEST(array,x,[sigma])
The ZTEST function syntax has the following arguments:

Array Required. The array or range of data against which to test x.

X Required. The value to test.

Sigma Optional. The population (known) standard deviation. If omitted, the sample standard deviation is used.
Remarks

If array is empty, ZTEST returns the #N/A error value.

ZTEST is calculated as follows when sigma is not omitted:
or when sigma is omitted:
where x is the sample mean AVERAGE(array); s is the sample standard deviation STDEV(array); and n is the number of observations in the sample COUNT(array).

ZTEST represents the probability that the sample mean would be greater than the observed value AVERAGE(array), when the underlying population mean is μ0. From the symmetry of the Normal distribution, if AVERAGE(array) < μ0, ZTEST will return a value greater than 0.5.

The following Excel formula can be used to calculate the twotailed probability that the sample mean would be further from μ0 (in either direction) than AVERAGE(array), when the underlying population mean is μ0:
=2 * MIN(ZTEST(array,μ0,sigma), 1  ZTEST(array,μ0,sigma)).
Example
Copy the example data in the following table, and paste it in cell A1 of a new Excel worksheet. For formulas to show results, select them, press F2, and then press Enter. If you need to, you can adjust the column widths to see all the data.
Data 

3 

6 

7 

8 

6 

5 

4 

2 

1 

9 

Formula 
Description (Result) 
Result 
=ZTEST(A2:A11,4) 
Onetailed probabilityvalue of a ztest for the data set above, at the hypothesized population mean of 4 (0.090574) 
0.090574 
=2 * MIN(ZTEST(A2:A11,4), 1  ZTEST(A2:A11,4)) 
Twotailed probabilityvalue of a ztest for the data set above, at the hypothesized population mean of 4 (0.181148) 
0.181148 
=ZTEST(A2:A11,6) 
Onetailed probabilityvalue of a ztest for the data set above, at the hypothesized population mean of 6 (0.863043) 
0.863043 
=2 * MIN(ZTEST(A2:A11,6), 1  ZTEST(A2:A11,6)) 
Twotailed probabilityvalue of a ztest for the data set above, at the hypothesized population mean of 6 (0.273913) 
0.273913 