If the inflexion points of a Normal Distribution are 6 and 14 . Find its SD?

Option a: 4. Solution: Points of Inflexion of a Normal Distribution a normal distribution with mean and standard deviation , the curve changes its curvature (concavity) at two points called the points of inflexion. points are mathematically located at a distance of one standard deviation ( ) on either side of the mean ( ): x1 = - x2 = + Given:- Lower point of inflexion = 6 - Upper point of inflexion = 14 can set up the following equations:1) - = 6 2) + = 14 solve for standard deviation , we subtract equation (1) from equation (2): ( + ) - ( - ) = 14 - 6 2 = 8 = 8/2 = 4 , the standard deviation of the normal distribution is 4 ., Option A is the correct answer.

If the inflexion points of a Normal Distribution are $6$ and $14$. Find its SD?

The correct answer is Option a: $4$. **Points of Inflexion of a Normal Distribution**\n\nFor a normal distribution with mean $\\mu$ and standard deviation $\\sigma$, the curve changes its curvature (concavity) at two points called the **points of inflexion**. \n\nThese points are mathematically located at a distance of one standard deviation ($\\sigma$) on either side of the mean ($\\mu$):\n$$x_1 = \\mu - \\sigma$$\n$$x_2 = \\mu + \\sigma$$\n\n**Given:**\n- Lower point of inflexion = $6$\n- Upper point of inflexion = $14$\n\nWe can set up the following equations:\n1) $\\mu - \\sigma = 6$\n2) $\\mu + \\sigma = 14$\n\nTo solve for standard deviation $\\sigma$, we subtract equation (1) from equation (2):\n$$(\\mu + \\sigma) - (\\mu - \\sigma) = 14 - 6$$\n$$2\\sigma = 8$$\n$$\\sigma = \\frac{8}{2} = 4$$\n\nThus, the standard deviation of the normal distribution is $4$.\n\nHence, **Option A** is the correct answer.

Theoretical DistributionsMTP Dec 2023 Series IIQuestion 3998 of 230

All Questions

If the inflexion points of a Normal Distribution are $\displaystyle 6$ and $\displaystyle 14$ . Find its SD?

Options

\displaystyle 4

\displaystyle 6

\displaystyle 10

\displaystyle 12

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Correct Answer

✅ Option a — $\displaystyle 4$

All Options:

A $\displaystyle 4$
B $\displaystyle 6$
C $\displaystyle 10$
D $\displaystyle 12$

Detailed Solution & Explanation

**Points of Inflexion of a Normal Distribution**\n\nFor a normal distribution with mean

\displaystyle \\mu

and standard deviation

\displaystyle \\sigma

, the curve changes its curvature (concavity) at two points called the **points of inflexion**. \n\nThese points are mathematically located at a distance of one standard deviation (

\displaystyle \\sigma

) on either side of the mean (

\displaystyle \\mu

):\n

x_1 = \\mu - \\sigma

x_2 = \\mu + \\sigma

\n\n**Given:**\n- Lower point of inflexion =

\displaystyle 6

\n- Upper point of inflexion =

\displaystyle 14

\n\nWe can set up the following equations:\n1)

\displaystyle \\mu - \\sigma = 6

\n2)

\displaystyle \\mu + \\sigma = 14

\n\nTo solve for standard deviation

\displaystyle \\sigma

, we subtract equation (1) from equation (2):\n

(\\mu + \\sigma) - (\\mu - \\sigma) = 14 - 6

2\\sigma = 8

\\sigma = \\frac{8}{2} = 4

\n\nThus, the standard deviation of the normal distribution is

\displaystyle 4

.\n\nHence, **Option A** is the correct answer.

About This Chapter: Theoretical Distributions

Paper

Paper 3: Quantitative Aptitude

Weightage

4-6 Marks

Key Topics

Binomial, Poisson, Normal Distribution

This chapter covers Binomial, Poisson, Normal Distribution and is part of Paper 3: Quantitative Aptitude in the CA Foundation exam.

View Official ICAI Syllabus

Exam Strategy Tip

This topic carries 4-6 Marks weightage. Focus on understanding core concepts rather than memorizing.

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If the inflexion points of a Normal Distribution are 6\displaystyle 66 and 14\displaystyle 1414. Find its SD?