Suppose where x is normal with mean &#x03BC;<!-- μ --> and variance &#x03C3;<!-- σ --> .

Karissa Sosa

Karissa Sosa

Answered question

2022-05-07

Suppose
where x is normal with mean μ and variance σ. Then I see how to derive mode of f ( y ) (distribution of y), as we need to find the value y that makes
f ( y ) == 0
However, why is mode not simply
e μ ?
y is a monotonic function of x, and so when x reaches its mode, then y should also reach its mode. The mode of x is its mean ( μ) hence y's mode should be
e μ
what mistake have I made?

Answer & Explanation

stafninumfu1tf

stafninumfu1tf

Beginner2022-05-08Added 18 answers

X has lognormal distribution if X = e Z where Z has normal distribution, Z N ( μ , σ 2 ). However, the density of X is then given by:
f ( x ) = 1 x 2 π σ 2 e 1 2 σ 2 ( ln ( x ) μ ) 2
Differentiating the density with respect to x we get
1 x 2 2 π σ 2 e 1 2 σ 2 ( ln ( x ) μ ) 2 1 x 2 π σ 2 e 1 2 σ 2 ( ln ( x ) μ ) 2 ln ( x ) μ σ 2 1 x
The mode is the value of x that maximizes the density. Thus, equating the above derivative to zero and simplifying, we get
1 ln ( x ) μ σ 2 = 0
or
x = e ( μ σ 2 )
To sum up, your mistake is that you have not used the correct density but the equation for the transformation of variables that gives us the random variable with log-normal distribution.

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