Question6. The random variable has a distribution with density . a) Determine . b) Determine .
Studdy Solution
STEP 1
1. The random variable has a probability density function (pdf) given by for .
2. The indicator function ensures that the pdf is zero for .
3. The constant must be determined such that the total probability integrates to 1 over the support of .
STEP 2
1. Determine the constant by integrating the pdf over its support.
2. Calculate .
STEP 3
Set up the integral of the pdf over its support to equal 1:
STEP 4
Integrate the function:
STEP 5
Solve for :
STEP 6
Calculate :
Since the support of is , we calculate:
STEP 7
Integrate the function:
The constant is:
The probability is:
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