Exams
Subjects
Classes
Home
Exams
Mathematics
Random Variables
a random variable x has t...
Question:
medium
A random variable X has the distribution: $P(X=1,2,3,4) = 0.1, 0.2, 0.3, 0.4$. The mean and standard deviation are:
Show Hint
Standard deviation is always the positive square root of the variance.
MHT CET - 2025
MHT CET
Updated On:
Jun 19, 2026
2 and 3
3 and 1
3 and $\sqrt{1}$
3 and 1
Show Solution
The Correct Option is
B
Solution and Explanation
Step 1: Understanding the Question:
We are given a discrete probability distribution and need to calculate the mean ($\mu$) and the standard deviation ($\sigma$).
Step 2: Key Formula or Approach:
1. Mean $\mu = E(X) = \sum x_i P(x_i)$.
2. Variance $\sigma^2 = E(X^2) - [E(X)]^2 = \sum x_i^2 P(x_i) - \mu^2$.
3. Standard Deviation $\sigma = \sqrt{\text{Variance}}$.
Step 3: Detailed Explanation:
First, calculate the mean $E(X)$:
\[ E(X) = 1(0.1) + 2(0.2) + 3(0.3) + 4(0.4) \] \[ E(X) = 0.1 + 0.4 + 0.9 + 1.6 = 3.0 \] Next, calculate $E(X^2)$:
\[ E(X^2) = 1^2(0.1) + 2^2(0.2) + 3^2(0.3) + 4^2(0.4) \] \[ E(X^2) = 0.1 + 4(0.2) + 9(0.3) + 16(0.4) \] \[ E(X^2) = 0.1 + 0.8 + 2.7 + 6.4 = 10.0 \] Now, calculate the variance:
\[ \sigma^2 = E(X^2) - [E(X)]^2 = 10 - 3^2 = 10 - 9 = 1 \] The standard deviation is:
\[ \sigma = \sqrt{1} = 1 \]
Step 4: Final Answer:
The mean is 3 and the standard deviation is 1.
Download Solution in PDF
Was this answer helpful?
0
Top Questions on Random Variables
The integral \( \int e^x \frac{2 + \sin 2x}{1 + \cos 2x} \, dx \) is equal to
MHT CET - 2024
Mathematics
Random Variables
View Solution
If the vector equation of the line \[ \frac{x - 2}{2} = \frac{2y - 5}{-3} = z + 1, \] is given by: \[ \vec{r} = \left(2\hat{i} + \frac{5}{2}\hat{j} - \hat{k}\right) + \lambda\left(2\hat{i} - \frac{3}{2}\hat{j} + p\hat{k}\right), \] then \( p \) is equal to:
MHT CET - 2024
Mathematics
Random Variables
View Solution
Let
\(X\)
be a random variable having binomial distribution
\(B(7, p)\)
. If
\(P(X = 3) = 5P(X = 4)\)
, then the sum of the mean and the variance of
\(X\)
is:
JEE Main - 2022
Mathematics
Random Variables
View Solution
A random variable
\(X\)
has the following probability distribution :
x
0
1
2
3
4
P(x)
k
2k
4k
6k
8k
The value of
\(P(1 < X < 4 | x ≤ 2)\)
is equal to
JEE Main - 2022
Mathematics
Random Variables
View Solution
Want to practice more? Try solving extra ecology questions today
View All Questions
Questions Asked in MHT CET exam
Which disease is primarily spread by female Anopheles mosquitoes?
MHT CET - 2024
HIV and AIDS
View Solution
How many ATP molecules are needed as an initial investment in the glycolytic cycle (normal glycolysis)?
MHT CET - 2024
Glycolysis
View Solution
Total genetic content of an organism is called
MHT CET - 2024
Non-Mendelian Genetics
View Solution
Two monkeys off mass 10 kg and 8 kg are moving along a vertical light rope the former climbing up with an acceleration of 2 m/second square while the latter coming down with a uniform velocity of 2 m/sec square find the tension in the rope at the fixed support
MHT CET - 2024
tension
View Solution
Maximize \( z = x + y \) subject to: \[ x + y \leq 10, \quad 3y - 2x \leq 15, \quad x \leq 6, \quad x, y \geq 0. \] Find the maximum value.
MHT CET - 2024
Linear Programming Problem
View Solution