Biostatistics Lectures PDF

Summary

These lecture notes cover biostatistics, focusing on measures of dispersion, including range, variance, and standard deviation. The content also describes population and sample variances. The material is from 2022, and is likely intended for undergraduate students at Zagazig University.

Full Transcript

Lectures of Biostatistics

Prepared By:

Assoc. Prof. M A Alawady
Department of Mathematics
Faculty of Science
Zagazig University
2022
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Median for Grouped Data

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Mode for Grouped Data

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 Descriptive Statistics
Measures of Dispersion
key words:
Descriptive Statistic, measure of
dispersion, range,variance, coefficient of
variation.

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 Descriptive Statistics -
Measures of Dispersion:
A measure of dispersion conveys information
regarding the amount of variability present in a set of
data.
Note:
1. If all the values are the same
→ There is no dispersion.
2. If all the values are different
→ There is a dispersion:
3.If the values close to each other
→The amount of Dispersion small.
b) If the values are widely scattered
→ The Dispersion is greater.
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 ** Measures of Dispersion are :
1.Range (R).
2. Variance.
3. Standard deviation.
4.Coefficient of variation (C.V).

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1.THE RANGE (R):

Range =Largest value- Smallest value = 𝑥(𝑛) − 𝑥(1)

Note:
Range concern only onto two values
Example :
43,66,61,64,65,38,59,57,57,50.
Find Range?
Range=66-38=28
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 2.The Variance:
It measure dispersion relative to the scatter of the values
a bout there mean.
a) Sample Variance ( 𝑆 2 ) :

σ 𝑛 2
(𝑥 − 𝑥)
lj
𝑆2 =
𝑖=1 𝑖 ,where 𝑥lj is the sample mean
𝑛−1
Example:
Refer to previous Example
Find Sample Variance of ages , 𝑥lj = 56
Solution:
S2= [(43-56) 2 +(66-56) 2+…..+(50-56) 2 ]/ 10
= 900/10 = 90
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 𝜎 2
b)Population Variance ( ) :

σ𝑁 2
(𝑥
𝑖=1 𝑖 − 𝜇)
𝜎2 =
𝑁

where 𝜇 is Population mean
3.The Standard Deviation:
is the square root of variance= 𝑉𝑎𝑟𝑖𝑛𝑐𝑒
a) Sample Standard Deviation = S = 𝑆 2
b) Population Standard Deviation = σ = 𝜎 2

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4.The Coefficient of Variation (C.V):

Is a measure use to compare the
dispersion in two sets of data which is
independent of the unit of the
measurement.
𝑆
𝐶. 𝑉 = 𝑋ሜ (100) where S: Sample standard
deviation.
𝑋ሜ : Sample mean.

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 Example:
Suppose two samples of human males yield the
following data:
Sampe1 Sample2
Age 25-year-olds 11year-olds
Mean weight 145 pound 80 pound
Standard deviation 10 pound 10 pound

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 We wish to know which is more variable.
Solution:
c.v (Sample1)= (10/145)*100= 6.9

c.v (Sample2)= (10/80)*100= 12.5

Then age of 11-years old(sample2) is more
variation

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