I think it would be the scholarly aptitude assessment
Difference between the mean of the data, including the outlier and excluding the outlier is;
B: 0.93
<h3>Mean average</h3>
Her time in minutes for the given months are;
- January = 41.55 minutes
- July = 36. 38 minutes
- Feb = 42.51 minutes
- Aug = 38.48 minutes
- Mar = 43. 01 minutes
- Sept = 41.87 minutes
- Apr = 39. 76 minutes
- Oct = 51.32 minutes
- May = 37. 32 minutes
- Nov = 42.59 minutes
- June = 35.28 minutes
- Dec = 43.71 minutes
Looking at all the numbers, they largely range from 36 to 44 which means that the outlier is 51.32
Total number of minutes with outlier = 493.78 minutes
Number of months = 12
Thus;
Mean with outlier = 493.78/12
Mean with outlier = 41.15 minutes
Mean without outlier = (493.78 - 51.32)/(12 - 1)
Mean without outlier = 40.22 minutes
Thus;
Difference in both means = 41.15 - 40.22
Difference = 0.93
Read more about mean average at; brainly.com/question/20118982
A limit of 10 scenes can be added to a tour: True.
<h3>What is a
3D Maps tour?</h3>
A 3D Maps tour can be defined as a software program which is designed and developed to show a time-based relationship that exist between geographic locations and their associated data such as:
- Degree of temperature (highs or lows).
In a 3D Maps tour, tours and scenes are typically used to save the 3D Maps visualizations of a data set and as many tours as needed can be created in a workbook.
However, an end user can add a limit of 10 scenes to a tour depending on the situation and data.
Read more on 3D Maps tour here: brainly.com/question/13695085
#SPJ1
You should talk to a college representative, representing the college you are interested in or a admission officer.
Answer:
A rotation, then a reflection.
Explanation:
Rotations and reflections are transformations that do not change the shape of the figures. In this case, whenever these two transformations are involved they form congruent figures. This process occurs first with the rotation and then with the reflection, thus creating a rotational symmetry, keeping the identical figures.
