The region that contains the most dispersed data is between the upper quartile and the median.
<h3>Which region contains the most dispersed data?</h3>
A box plot is used to study the distribution and level of a set of scores. The box plot consists of whiskers which measure the minimum and maximum numbers.
On the box, the first line to the left represents the lower (first) quartile. The next line on the box represents the median. The third line on the box represents the upper (third) quartile.
- Difference between the lower quartile and the median : 300 - 275 = 25
- Difference between the upper quartile and the median : 340 - 300 = 40
- Difference between the upper quartile and the maximum : 355 - 340 = 15
- Difference between the minimum and the lower quartile : 275 - 250 = 25
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Answer:
375 cm
Step-by-step explanation:
Answer:
20- max volume dimension
Step-by-step explanation:
since we don't know the amount of cardboard cut off, we'll take it as "x"^^
so the bottom of the box have dimensions of 40-2x(since squares are cut from both corners in a side) by 40-2x hence we can take area of base as
(40-2x)^2
since v=base*height
lets take height as x
x(40-2x) (40-2x)=v
(40x-2x^2)(40-2x)=v
4x^3-160x^2+1600x=v
take the derivitive: 12x^2-320x+1600
factor:
4(3x^2-80x +400)=0
4(3x-20)(x-20)=0
12x-80=0
x-20=0
x=20, 6.667(reduced from 6.66666666667)
Answer: It is D
Step-by-step explanation:
3ft in a yd
14ft to 6ft to 7ft to 3ft
3/73 is the slope of line c
