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Formulan statistics. Business Statistics sa
Typology: Study notes
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Mean Median Mode Variance Standard Deviation If n (^) is odd, (^) then M= () th
If n^ is even, then M= (4)lterm+(+1)"term 2 The value which OCCurs (^) most frequently S=o=
X= Observations given
number of (^) observations
number of (^) observations X= Observations given = (^) Mean n= Total number of (^) observations X= Observations given = (^) Mean n=Total number of (^) observations
Mean Deviation Formula The mean^ deviation is^ also known as^ the mean (^) absolute deviation and is (^) defined as the mean^ of the absolute deviations of the observations from (^) the suitable average
as (^) stated beloW: Mean Deviation (^) from Mean = Mean Deviation (^) from Median = Here,
X (^) =Observations X = (^) Mean N= The number of^ observations
For (^) frequency distribution, (^) the mean
M. (^) D = IM Lix-X
Solved (^) Example
26, 46, 56, 45, 19,^ 22, (^) 24. Solution:
26, 46, 56, 45, 19,^ 22, (^24) Mean =^ (26 +^46 +^56 +^45 +^19 +^22 +^ 24)/ =
26 46 56 45 19 22 24
(8-+12+22+11+15+12-+10) 12
22 15
absolute values: 12 10
the given^ data set^ is^ 12.857.
Population Mean Formula The ratio wherein the addition of the values to (^) the (^) number of (^) the value is^ a^ population mean -^ if^ the possibilities are (^) equal. A
made.
the following^ formula: Where, = (^) Sum of the values N= Number of^ the value
Solution:
following (^) numbers 1,^ 2,3,4,^ 5. Given, -1,2, (^) 3,4, =|+2 (^) +3+ 4 +5= N= Population Mean =
N
X
The (^) sample (^) size (^) formula helps us (^) find (^) the
Since it^ not^ possible (^) to survey (^) the whole population, we^ take a^ sample from (^) the
Learn (^) More: (^) Confidence Interval (^) Formula Sample Size^ Formula for Infinite (^) and Finite Population
hold good (^) for (^) the whole sample. We (^) have a
not.Confidence level (^) helps describe how
hold true or^ aCcurate.
population is^ given as: Formulas (^) for (^) Sample Size (^) (Ss) For (^) Infinite (^) Sample (^) Size For (^) Finite (^) Sample Size Where,
p=Percentage of (^) population •C= Confidence^ level
Sample Size^ Formula Example Question: Find^ the sample^ size for^ a^ finite and infinite^ population^ when^ the percentage (^) of 4300 population is^ 5, confidence level^99 and confidence interval is 0.01? Solution: Z= From^ the z-table,^ we have the value of confidence level,^ that is^ 2.58 by applying given (^) data in (^) the (^) formul: SS = (2.58)x0.05x(1-0.05) = (^316) Sample (^) size for (^) finite population
= (^294) New SS^ = 294
Quartile (^) Formula A (^) quartile (^) divides (^) the set of (^) observation into (^4) equal parts. The (^) middle term, (^) between (^) the median and first term^ is^ known as^ the first or Lower (^) Quartile (^) and is (^) written as^ Q1.^ Similarly, the value of^ mid term^ that lies between the last term and the median is^ known as^ the third or^ upper^ quartile and is^ denoted as^ Q3. Second Quartile^ is^ the median and is^ written as (^) Q2. When (^) the set^ of^ observation is^ arranged in an (^) ascending (^) order, then the 25th percentile is (^) given as:
n
4
th The (^) second quartile or^ the 50th percentile or the Median^ is^ given^ as: th 4
The third Quartile of (^) the 75th (^) Percentile (Q3) is (^) given as:
th
The Upper quartile is^ given by rounding to the nearest^ whole^ integer^ ifthe solution^ is coming in^ decimal number. The^ major use of (^) the lower (^) and upper^ quartile helps is^ that it (^) helps us^ measure^ the dispersion in (^) the set of (^) the (^) datagiven. The dispersion is^ also called "inter^ quartile^ range",^ denoted as^ IQR, inter quartile^ range^ is^ the difference between lower^ and upper^ quartile. IQR =^ Upper^ Quartile -^ Lower Qu To find (^) the quartile we^ first (^) need to arrange the values in^ ascending^ order.^ Then^ we need to^ put^ the formula to^ use.^ Let's^ solve one (^) example to (^) make it (^) clear to you:
Solved example Question: Find^ the median, lower quartile, upper (^) quartile (^) and inter-quartile range (^) of the following^ data set^ of^ scores:^ 19,^ 21,^ 23,^ 20,
First, (^) lets arrange^ of (^) the values in an
31 Now (^) let's (^) calculate the Median, 2= ("Term Q2= (^) ("Term = (^) 5h Term = (^23)
() Term^
th Q =())"Term Q 4 4 3(9+1) th
=
Average (^) of (^) 2nd (^) and 3rd terms
=
=
=
=
SCores? Solution:
Standardized random variable X=^80
= (^15) Formula for^ Z^ score^ is^ given^ below: Z
=
= (^) 0. Calculation of^ student's Z^ score^ for^ second quiz:
Mean (^) %= 54
= (^12) Formula for Z^ score^ is^ given^ below: Z (^) Score =^ (x
= (^175)
An (^) essential component of (^) the Central Limit
the population mean. Similarly, if^ you^ find (^) the average^ of all of (^) the standarddeviations^ in^
find (^) the actual (^) standarddeviation (^) for your
population.
sample size. Central limit^ theorem is^ applicable^ for^ a
formula for^ central limit^ theorem can^ be
and
Where,
Sample mean = (^) Sample standard deviation
Linear Regression Formula Linear regression is (^) the most (^) basic and commonly (^) used predictive analysis. One variable is^ considered to^ be an^ explanatory variable, (^) and the other is^ considered to^ be a dependent variable. For^ example, a^ modeler might want to (^) relate the weights of individuals to^ their heights using a^ linear regression model. There are^ several linear (^) regression analyses available to^ the researcher. Simple linear regression
a (^) and (^) bare given by the following formulas: a(intercept) =
Where, X (^) and yare two (^) variables on (^) the regression line. b= Slope^ of^ the^ line. a=rintercept of the line. X=Values of^ the first (^) data set. y=Values of^ the second data set.
Question: Find^ linear regression (^) equation for the following^ two^ sets^ of^ data: Solution: y Construct (^) the following^ table: X a (^) = 2 a = 4 6 8 = (^20) 4x144-20x 4x 120-
b=0. 2 g=1. 3
7 5 = 10 n(- 25x120-20x 144 4(120)- y=1.