Statistics Resources>Minitab Tutorials by Dr. Matos to see how to complete the problem using Minitab.Open Geogebra and choose "Probability Calculator." You can also get to this through the "View"...

Statistics Resources>Minitab Tutorials by Dr. Matos to see how to complete the problem using Minitab. Open Geogebra and choose "Probability Calculator." You can also get to this through the "View" menu. This opens in a new window (the online/app version may behave differently). The default is a Normal distribution with mean 0 and standard deviation 1 (the Standard Normal). Select Normal from the drop-down menu just below the graph, and choose "Binomial." The default is n = 20 observations/trials with p = 0.5 probability of success on each trial. From 8 - 12 success are highlighted, with total probability 0.7368. You might have to resize the bottom part of the display to see this. To the right of the graph, the probabilities for exactly k successes are shown. Click here for a screenshot. - Part 1 Keeping n = 20 and p = 0.5, compute the probabilities of the following. Use four decimal places, and do not convert to percent. • Exactly 7 successes in 20 independent observations: Help me! Exactly 10 successes in 20 independent observations: Help mel Part 2 Part 31 Part 4 "/>
Extracted text: You can complete this problem using either Minitab or Geogebra, but you will likely find the visualization of Geogebra easier to understand. Instructions are given here for Geogebra, but you can review the video "Using Minitab with the Binomial Distribution" in D2L under Content>Statistics Resources>Minitab Tutorials by Dr. Matos to see how to complete the problem using Minitab. Open Geogebra and choose "Probability Calculator." You can also get to this through the "View" menu. This opens in a new window (the online/app version may behave differently). The default is a Normal distribution with mean 0 and standard deviation 1 (the Standard Normal). Select Normal from the drop-down menu just below the graph, and choose "Binomial." The default is n = 20 observations/trials with p = 0.5 probability of success on each trial. From 8 - 12 success are highlighted, with total probability 0.7368. You might have to resize the bottom part of the display to see this. To the right of the graph, the probabilities for exactly k successes are shown. Click here for a screenshot. - Part 1 Keeping n = 20 and p = 0.5, compute the probabilities of the following. Use four decimal places, and do not convert to percent. • Exactly 7 successes in 20 independent observations: Help me! Exactly 10 successes in 20 independent observations: Help mel Part 2 Part 31 Part 4