Answer: -The mean is not affected by the existence of an outlier.
Step-by-step explanation:
An outlier is an ultimate value in a set of data that is very much higher or lower than the other numbers. Mean is the only central tendency which is affected by the outlier. (It also affect the standard deviation)
It can affect the mean of a data set by skewing the results so that the mean is no longer representative of the data set.
The median and the interquartile range is unaffected by the existence of an outlier.
Answer: The mean is not affected by the existence of an outlier.
Step-by-step explanation it’s on math nation
Meg has better score in quiz on first quiz.
Percentage is defined as the parts of a number per fraction of 100. We have to divide a number with it's whole and then multiply with 100 to calculate the percentage of any number.
So the percentage actually means a part per 100.
Percentage is usually denoted by the symbol '%'.
Given that,
Percentage of questions Meg answered correctly in the first quiz = 92%
On her second quiz, she answered 27 out of 30 questions correctly.
Percentage of questions Meg answered correctly in the second quiz
= (27 / 30) × 100
= 0.9 × 100
= 90%, which is less percentage than the one on the first quiz.
Since the percentage of correctly answered questions in the first quiz is greater than that of the second quiz, Meg has better score on first quiz.
To learn more about Percentage, click on the link below :
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A. The sample is the percentage of students who ride the bus.
B. The sample might not be representative of the population because it only includes students who are attending an after-school activity.
C. The sample shows that exactly 38% of the students in the school ride the bus.
We know that the area of a rectangle can be written as: length x width
so:
l x (1/5) = 9/20
9/20 x 5/1 = 45/20, which can be reduced to 9/4
So the length is 9/4 miles