Subscription Required
To get access to this video, and more than 1000 like it Subscribe Online today!
Creating Normality Plots in SigmaXL
Learn how to generate normality plots within SigmaXL while also learning what the so-called “fat pencil test” is all about.
Course Videos
Inferential Statistics Overview and Sampling
6:28
2Sampling in Minitab Online
00:03:19
3Hypothesis Testing Overview
9:54
4Normality
9:39
5Creating Normality Plots In Minitab Online
00:01:12
Current Video
Creating Normality Plots in SigmaXL
3:03
Next VideoCentral Limit Theorem
9:35
8The Z-Score
8:59
9The Z-Score in SigmaXL
6:21
10Creating Run Charts
5:28
11Creating Run Charts In Minitab Online
00:02:30
12Creating Run Charts in SigmaXL
1:45
131-Sample t-Test
6:30
14Conducting A 1-sample T-test In Minitab Online
00:02:17
15Conducting a 1-Sample t-Test in SigmaXL
2:48
162 Variances Test
8:55
17Conducting a 2 Variances Test in Minitab Online
00:03:07
18Conducting a 2 Variances Test in SigmaXL
3:18
192 Sample t-Test
7:43
20Creating a 2 Sample T-Test in Minitab Online
00:01:54
21Creating a 2 Sample t-Test in SigmaXL
2:57
22Paired t-Test
6:50
23Conducting a Paired T-Test in Minitab Online
00:02:31
24Conducting a Paired t-Test in SigmaXL
4:37
251-Proportion Test
4:48
26Conducting a 1-Proportion Test in Minitab Online
00:01:37
272 Proportions Test
6:08
28Conducting a 2 Proportions Test in Minitab Online
00:01:59
29Conducting a 2 Proportions Test in SigmaXL
2:44
30Chi Square Test
9:49
31Conducting a Chi Square Test in Minitab Online
00:01:11
32Creating a Chi Square Test in SigmaXL
2:14
331 Sample Sign Test
4:15
34Conducting a 1 Sample Sign Test in Minitab Online
00:01:18
35Conducting a 1 Sample Sign Test in SigmaXL
1:40
36Mann-Whitney Test
5:12
37Conducting a Mann-Whitney Test in Minitab Online
00:03:17
38Conducting a Mann-Whitney Test in SigmaXL
4:59
You must be logged in to access Gemba Academy resources.
Video Resources
Course Resources
Next Video Central Limit Theorem
In this module Ron Pereira introduces one of the most profound statistical concepts of all time — the Central Limit Theorem — by first explaining the concept before demonstrating it with a powerful web-based simulator that is free to access.