Topics

General Knowledge
General Science
General English
Aptitude
General Computer Science
General Intellingence and Reasoning
Current Affairs
Exams
Elementary Mathematics
English Literature

The value of mean, median and mode coincides, then the distribution is

A) Positive skewness
B) Symmetrical distribution
C) Negative skewness
D) All of these

Correct Answer:


B) Symmetrical distribution

Description for Correct answer:
If mean, median and mode coincides, then there is a symmetrical distribution.

Part of solved Statistics questions and answers : >> Elementary Mathematics >> Statistics

Comments

Similar Questions

1). The algebraic sum of the deviation of 20 observations measured from 30 is 2. Then mean of observations is

A). 28.5

B). 30.1

C). 30.5

D). 29.6

-- View Answer

2). The mean value of the median and mean of the add divisions of 360 is

A). 13

B). 7

C). 6

D). 10

-- View Answer

3). If the mean of n items is \( \Large \overline{x} \) and the sum of any \( \Large \left(n-1\right)\) number is R, then the value of left item is

A). \( \Large n+\overline{x} \)

B). \( \Large n\overline{x}-R \)

C). \( \Large \overline{x}+Rn \)

D). \( \Large n\overline{x}-nR \)

-- View Answer

4). In a class of 50 students, 10 have failed and their average marks are 28. The total marks obtained by the entire class on 2800. The average marks of those who have passed, are

A). 43

B). 53

C). 63

D). 70

-- View Answer

5). The mean of n observations is \( \Large \overline{x} \). If one observation \( \Large x_{n+1} \) is added, then the mean remains same. The value of \( \Large x_{n+1} \) is:

A). 0

B). 1

C). n

D). \( \Large \overline{x} \)

-- View Answer

6). In a class of 100 students, the average amount of pocket money is Rs.35 per student. If the average is Rs.25 for girls and Rs.50 for boys, then the number of girls in the class is

A). 20

B). 40

C). 60

D). 80

-- View Answer

7). The mean of the n observations \( \Large x_{1},\ x_{2},\ x_{3}.....,\ x_{n} \) be \( \Large \overline{x} \). Then, the mean of n observations \( \Large 2x_{1}+3,\ 2x_{2}+3,\ 2x_{3}+3,.......2x_{n}+3 \) is

A). \( \Large 3\overline{x}+2 \)

B). \( \Large 2\overline{x}+3 \)

C). \( \Large \overline{x}+3 \)

D). \( \Large 2\overline{x} \)

-- View Answer

8). If\( \Large \overline{x}_{1}\ and\ \overline{x}_{2} \) are the mean of two distributions such that \( \Large \overline{x}_{1}\ <\ \overline{x}_{2}\ and\ \overline{x} \) is the mean of the combined distribution, then

A). \( \Large \overline{x}\ <\ \overline{x}_{1} \)

B). \( \Large \overline{x}\ >\ \overline{x}_{2} \)

C). \( \Large \overline{x} = \frac{\overline{x}_{1} \times \overline{x}_{2}}{2} \)

D). \( \Large \overline{x}_{1}\ <\ \overline{x}\ <\ \overline{x}_{2} \)

-- View Answer

9). If the variance of 1, 2, 3, 4, 5,........., 10 is \( \Large \frac{99}{12} \), then the standard deviation of 3, 6, 9, 12, ....., 30

A). \( \Large \frac{297}{4} \)

B). \( \Large \frac{3}{2}\sqrt{33} \)

C). \( \Large \frac{3}{2}\sqrt{99} \)

D). \( \Large \sqrt{\frac{99}{12}} \)

-- View Answer

10). The AM of \( \Large ^{2n+1}C_{0},\ ^{2n+1}C_{2},\ .....^{2n+1}C_{n} \) is

A). \( \Large \frac{2^{n}}{n} \)

B). \( \Large \frac{2^{n}}{n+1} \)

C). \( \Large \frac{2^{2n}}{n} \)

D). \( \Large \frac{2^{2n}}{ \left(n+1\right) } \)

-- View Answer