Respuesta :
Answer:
Mean = 125.136
Median = 110
Mode = 180
Step-by-step explanation:
Given the data:
75 95 180 136 89 75 110 180 100 136 180 95 180 136 75 100 110 180 180 136 75 90
Frequency distribution:
Value(X) ___freq (F) ____cumm frequency
85 _________ 4 _______ 4
89 _________ 1 _______5
90 __________1 _______6
95 __________2 ______ 8
100 _________ 2 ______10
110 __________2______ 12
136 __________4 _____ 16
180 __________6______22
2) Using the frequency distribution :
Mean = Σfx / Σf
[(85*4) + (89*1) + (90*1) + (95*2) + (100*2) + (110*2) + (136*4) + (180*6)]/ 10
= 2753 / 22
= $125.136
Median of grouped data :
Frequency + 1 / 2 = 23/2 = 11.5 th term
The median value = $110
Mode of the data:
Most frequently occurring = 180 (frequency of 6)
The mean of the frequency distribution is $125.136, the median of the frequency distribution is $110, and the mode of the frequency distribution is $180.
Given :
- Jack wants to buy a pair of name-brand headphones on a popular auction website.
- He enters the brand, make, and model number and searches the site for what is available.
- He notices that some headphones are being offered as "buy now" with a fixed price and others are up for bid in auctions.
a) The frequency distribution is given below:
Prices Frequency Cumulative Frequency
85 4 4
89 1 5
90 1 6
95 2 8
100 2 10
110 2 12
136 4 16
180 6 22
b) The mean is calculated as:
[tex]\rm Mean = \dfrac{85\times4 + 89\times1 +90\times1 +95\times 2+100\times2 +110\times2 +136\times4 +180\times6 }{10}[/tex]
Simplify the above expression.
Mean = $125.136
c) The median of the frequency distribution is calculated as:
[tex]\rm Term= Frequency + \dfrac{1}{2}=11.5[/tex]
So, the median is $110.
The mode of the frequency distribution is $180.
For more information, refer to the link given below:
https://brainly.com/question/4393505
