Suppose that a random variable X satisfies E (3X − 6) = 3 and V ar [2X + 1] = 16. Use Chebyshev’s Inequality to bound P (X ≥ 17).
Suppose that a random variable X satisfies E (3X − 6) = 3 and V ar...
Suppose that the density function of a continuous random variable is given by f(x)=c(e-2x-e-3x) for non-negative x, and 0 elsewhere a) Determine c b) Compute P(X>1) c) Calculate PX<0.5 X<1.0)
Exercise 2 Consider a random variable X with E]5 and VarX 16 (a) Calculate P(lz-5 < 6) if X follows a normal distribution. (b) Use Chebyshev's inequality to provide a lower bound for P(-5). (No longer assume X is normal.)
g(x?)dx for "all" functions g: R R . Suppose that a random variable X satisfies E (g(X) = ")= ' What is P (= < x < )
2 of 3 01- 5. Suppose X is a discrete random variable that has a geometric distribution with p= a. Compute P(X > 6). [5] b. Use Markov's Inequality to estimate P(X > 6). [5] c. Use Chebyshev's Inequality to estimate P(X > 6). (5)
Suppose X is a random variable that has density function f(x) = (1/2)e^−|x| for −∞ < x < ∞. Find: (a) (2 pts) P(X < 10). (b) (4 pts) The c.d.f. of X2. (c) (4 pts) V ar(X)
The random variable X is distributed as a Pareto distribution with parameters α = 3, θ. E[X] = 1. The random variable Y = 2X. Calculate V ar(Y )
6. If E(x) 16 and E(X?) -292, use Chebyshev's inequality to determine a) A lower bound for P(8< X < 24). (b) An upper bound for P(X 162 18)
Please show your work with a brief but logical explanation.
Suppose X is a random variable with p(X 0) 4/5, p(X-1) 1/10, p(X-9) 1/10. Then (a) Compute Var [X] and B [X] (b) What is the upper bound on the probability that X is at least 20 obained by applying Markov's inequality? c) What is the upper bound on the probability that X is at least 20 obained by applying Chebychev's inequality'?
Suppose X is a random variable with p(X...
4. Suppose that X is a random variable having the following probability distri- bution function - 0 if r<1 1/2 if 1 x <3 1 if z 2 6 (a) Find the probability mass function of X. (b) Find the mathematical expectation and the variance of X (c) Find P(4 X < 6) and P(1 < X < 6). (d) Find E(3x -6X2) and Var(3X-4).