Homework SourseDetermine the value of k that makes the function below a pdf
Determine the value of k that makes the function below a pdf for a continuous random variable.
Solution
f(x) must be normalized, so
Integral [f(x) dx] = 1
Integral [k(x^2+2) dx]|(1,2) = 1
k Integral [(x^2+2) dx]|(1,2) = 1
k [x^3/3 + 2x]|(1,2) = 1
k[(2^3/3 +2*2) - (1^3/3 + 2*1)] = 1
k(4.333333333) = 1
k = 0.230769231 or 3/13 [ANSWER]
![Determine the value of k that makes the function below a pdf for a continuous random variable.Solutionf(x) must be normalized, so Integral [f(x) dx] = 1 Integra](/WebImages/6/determine-the-value-of-k-that-makes-the-function-below-a-pdf-987044-1761507180-0.webp "Determine the value of k that makes the function below a pdf for a continuous random variable.Solutionf(x) must be normalized, so Integral [f(x) dx] = 1 Integra")
