Suppose X is a continuous unknown and satisfies -a < X < a, with a > 0, and the pdf of X, denoted f, satisfies f (x) = c(x + a)², x < 0, %3D and f (x) = c(x – a)², æ > 0, %3D where c is a positive normalizing constant. If a = 3, then %3D what is c? 18 O 2/9 1/18 4.5 NONE OF THE OTHERS
Suppose X is a continuous unknown and satisfies -a < X < a, with a > 0, and the pdf of X, denoted f, satisfies f (x) = c(x + a)², x < 0, %3D and f (x) = c(x – a)², æ > 0, %3D where c is a positive normalizing constant. If a = 3, then %3D what is c? 18 O 2/9 1/18 4.5 NONE OF THE OTHERS
Suppose X is a continuous unknown and satisfies -a < X < a, with a > 0, and the pdf of X, denoted f, satisfies f (x) = c(x + a)², x < 0, %3D and f (x) = c(x – a)², æ > 0, %3D where c is a positive normalizing constant. If a = 3, then %3D what is c? 18 O 2/9 1/18 4.5 NONE OF THE OTHERS
How do I find an unknown positive normalizing constant, given x is a continuous unknown and the PDF of x?
Transcribed Image Text:Suppose X is a continuous unknown and satisfies
-a < X < a, with a > 0, and the pdf of X, denoted f,
satisfies
f (x) = c(x + a)², æ < 0,
and
f (x) = c(x – a)², x > 0,
%D
where c is a positive normalizing constant. If a = 3, then
what is c?
18
2/9
O 1/18
O 4.5
NONE OF THE OTHERS
Definition Definition Probability of occurrence of a continuous random variable within a specified range. When the value of a random variable, Y, is evaluated at a point Y=y, then the probability distribution function gives the probability that Y will take a value less than or equal to y. The probability distribution function formula for random Variable Y following the normal distribution is: F(y) = P (Y ≤ y) The value of probability distribution function for random variable lies between 0 and 1.
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