(A) Consistency is measured by the coefficient of variation $(CV)$. $A$ lower $CV$ implies higher consistency.Batsman $A$ is more consistent than $B$,

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(A) Consistency is measured by the coefficient of variation $(CV)$. $A$ lower $CV$ implies higher consistency.Batsman $A$ is more consistent than $B$,so $CV_{A} This implies $\frac{\sigma_{A}}{\bar{x}} Rearranging this gives $\frac{\sigma_{A}}{\sigma_{B}} Since $\sigma_{A}, \sigma_{B}, \bar{x}, \bar{y} > 0$,we have $0 For $A$ to be a higher run scorer,we must have $\bar{x} > \bar{y}$,which implies $\frac{\bar{x}}{\bar{y}} > 1$.

Class 11 Mathematics Statistics Word problem -Statistics

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$\bar{x}$ and $\bar{y}$ are the arithmetic means of the runs of two batsmen $A$ and $B$ in $10$ innings respectively,and $\sigma_{A}$ and $\sigma_{B}$ are the standard deviations of their runs. If batsman $A$ is more consistent than $B$,then he is also a higher run scorer only when

AP EAMCET 2024 All AP EAMCET

A
$0 < \frac{\sigma_{A}}{\sigma_{B}} < \frac{\bar{x}}{\bar{y}}$ and $\frac{\bar{x}}{\bar{y}} > 1$
B
$\frac{\bar{x}}{\bar{y}} > \frac{\sigma_{A}}{\sigma_{B}} > 1$
C
$\frac{\bar{x}}{\bar{y}} < \frac{\sigma_{A}}{\sigma_{B}} > 1$
D
$\frac{\bar{x}}{\bar{y}} > 1$ and $1 \leq \frac{\bar{x}}{\bar{y}} < \frac{\sigma_{A}}{\sigma_{B}}$

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Let ${x_1}, {x_2}, ..., {x_n}$ be $n$ observations such that $\sum x_i^2 = 400$ and $\sum x_i = 80$. Then a possible value of $n$ among the following is:

DifficultAIEEE 2005

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If the mean of the data:
Class $5 - 10$ $10 - 15$ $15 - 20$ $20 - 25$ $25 - 30$ $30 - 35$
Frequency $2$ $k$ $28$ $54$ $k + 1$ $5$

is $21$,then $k$ is one of the roots of the equation:

DifficultJEE MAIN 2026

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The mean of $5$ observations is $4.4$ and their variance is $8.24$. If three of those observations are $1, 2$ and $6$,then the other two observations are:

DifficultAP EAMCET 2023

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If the coefficients of variation of two distributions are $40$ and $20$ and their variances are $144$ and $64$ respectively,then the mean of their arithmetic means is
$(A)$ $40$
$(B)$ $12$
$(C)$ $30$
$(D)$ $35$

EasyTS EAMCET 2018

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The average marks of boys in a class is $40$ and that of girls is $45$. The average marks of both boys and girls combined is $42$. Then the percentage of boys in the class is (in $\%$)

EasyAP EAMCET 2020

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Class	$5 - 10$	$10 - 15$	$15 - 20$	$20 - 25$	$25 - 30$	$30 - 35$
Frequency	$2$	$k$	$28$	$54$	$k + 1$	$5$

$\bar{x}$ and $\bar{y}$ are the arithmetic means of the runs of two batsmen $A$ and $B$ in $10$ innings respectively,and $\sigma_{A}$ and $\sigma_{B}$ are the standard deviations of their runs. If batsman $A$ is more consistent than $B$,then he is also a higher run scorer only when

Similar Questions

Let ${x_1}, {x_2}, ..., {x_n}$ be $n$ observations such that $\sum x_i^2 = 400$ and $\sum x_i = 80$. Then a possible value of $n$ among the following is:

If the mean of the data:Class$5 - 10$$10 - 15$$15 - 20$$20 - 25$$25 - 30$$30 - 35$Frequency$2$$k$$28$$54$$k + 1$$5$is $21$,then $k$ is one of the roots of the equation:

The mean of $5$ observations is $4.4$ and their variance is $8.24$. If three of those observations are $1, 2$ and $6$,then the other two observations are:

If the coefficients of variation of two distributions are $40$ and $20$ and their variances are $144$ and $64$ respectively,then the mean of their arithmetic means is$(A)$ $40$$(B)$ $12$$(C)$ $30$$(D)$ $35$

The average marks of boys in a class is $40$ and that of girls is $45$. The average marks of both boys and girls combined is $42$. Then the percentage of boys in the class is (in $\%$)

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If the mean of the data:
Class $5 - 10$ $10 - 15$ $15 - 20$ $20 - 25$ $25 - 30$ $30 - 35$
Frequency $2$ $k$ $28$ $54$ $k + 1$ $5$

is $21$,then $k$ is one of the roots of the equation:

If the coefficients of variation of two distributions are $40$ and $20$ and their variances are $144$ and $64$ respectively,then the mean of their arithmetic means is
$(A)$ $40$
$(B)$ $12$
$(C)$ $30$
$(D)$ $35$