Answer:
7
Step-by-step explanation:
add 6 to -6 to get 0
than add 1 to 0 to get 1
6+1=7
The distance between the points (-3,-6) and (-3, 1), both lying on the same vertical line, is found by subtracting their y-coordinates. The distance is 7 units.
The subject of this question is in the field of Math, specifically focusing on the concept of distance between two points in a plane. In this case, you are asked to find the distance between the points (-3,-6) and (-3, 1). The calculation is very straightforward as both points lie on the same vertical line where the x-coordinate of both points is -3. To find the distance between two points which lie on the same line , we can simply subtract the two y-coordinates.
So, the distance is given by the absolute value of the difference between the y-coordinates: |1 - (-6)| = |1 + 6| = |7| = 7.
So, the distance between (-3,-6) and (-3,1) is 7 units.
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B. 7
C. 8
D. 6
Median of the data distribution given in the histogram using the cumulative frequency is 8.
The class width = 1
The values of the data are,
4, 1, 1, 1, 1, 3, 4, 4, 6.
Cumulative frequencies = 4, 5, 6, 7, 8, 11, 15, 19, 25
n = 25 and n/2 = 12.5
Median lies on the 12.5th observation.
12.5th observation lies in the class where cumulative frequency is 15.
Median class is 7.5 - 8.5.
l, lower limit of median class = 7.5
n = 25
f = frequency of median class = 4
cf, cumulative frequency of class preceding the median class = 11
h, class size = 1
Median = l + [(n/2 - cf) / f] h
= 7.5 + [(25/2 - 11) / 4] 1
= 7.875 ≈ 8
Learn more about Median here :
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C 2/3(2x+4)
D 2/3(2x+7)Please show all work and make it easy to understand please
times as tall as the shortest girl in the sixth grade, who is
4 1/4 feet tall. How tall is Jebb?
Answer:
Jebb-44/82
11/2 x 41/4=44/82
Private Public
First Quartile $58,000 $35,000
Second Quartile (Median) $71,000 $42,000
Third Quartile $85,000 $54,000
Based on the samples, what generalization can be made?
The top ten percent of both the private and public university graduates surveyed earned more than $60,000 annually.
The interquartile range for public universities is $19,000 more than for private universities.
The top twenty-five percent of both the private and public university graduates surveyed earned more than $50,000 annually.
The interquartile range for private universities is $27,000 more than for public universities.