Question

Memoryless property: Show that in general, P(X > x +t | X > x) = P(X...

Memoryless property: Show that in general,

P(X > x +t | X > x) = P(X > t)

Homework Answers

Know the answer?
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for?
Ask your own homework help question
Similar Questions
Give the definition of memoryless for a random variable X. (b) Show that if X is...
Give the definition of memoryless for a random variable X. (b) Show that if X is an exponential random variable with parameter λ, then X is memoryless. (c) The life of the brakes on a car is exponentially distributed with mean 50,000 miles. What is that probability that a car gets at least 70,000 miles from a set of brakes if it already has 50,000 miles?
show that q(x,t)=f(x+vt) and  q(x,t)=f(x-vt) are general solutions for thworynof vibrating strings
show that q(x,t)=f(x+vt) and  q(x,t)=f(x-vt) are general solutions for thworynof vibrating strings
Let Y denote a geometric random variable with probability of success p, (a) Show that for...
Let Y denote a geometric random variable with probability of success p, (a) Show that for a positive integer a, P(Y > a) = (1 − p) a (b) Show that for positive integers a and b, P(Y > a + b|Y > a) = P(Y > b) = (1 − p) b This is known as the memoryless property of the geometric distribution.
To the best of your ability, explain in words why the memoryless property does not apply...
To the best of your ability, explain in words why the memoryless property does not apply to the following random variable types specifically: • Binomial random variables • Poisson random variables • Pascal random variables
A random variable XX with distribution Exponential(λ)Exponential(λ) has the memory-less property, i.e., P(X>r+t|X>r)=P(X>t) for all r≥0...
A random variable XX with distribution Exponential(λ)Exponential(λ) has the memory-less property, i.e., P(X>r+t|X>r)=P(X>t) for all r≥0 and t≥0.P(X>r+t|X>r)=P(X>t) for all r≥0 and t≥0. A postal clerk spends with his or her customer has an exponential distribution with a mean of 3 min3 min. Suppose a customer has spent 2.5 min2.5 min with a postal clerk. What is the probability that he or she will spend at least an additional 2 min2 min with the postal clerk?
1   Define by T:P2-P2 is given by T(p(x))=p(x)-p'(x) a. Prove that T is a linear transformation....
1   Define by T:P2-P2 is given by T(p(x))=p(x)-p'(x) a. Prove that T is a linear transformation. b. Show T is one to one. c. If   is given by . Explain why T is not one to one.
Given a input x(t) output y(t) relation as y(t) = x(0.5+t) + e^( - | x(0.5-t)...
Given a input x(t) output y(t) relation as y(t) = x(0.5+t) + e^( - | x(0.5-t) | ). Determine the system is (a) Memoryless (b) Time invariant (c) Linear (d) Causal (e) stable.
Consider a system defined by the input-output relationship given below: y(t) = x(t)x(t-2) a) Is the...
Consider a system defined by the input-output relationship given below: y(t) = x(t)x(t-2) a) Is the system memoryless? Why? b) Is the system stable? Why? c) Is the system causal? Why? d) Is the system invertible? Show why? e) Find the impulse response of the system. PLEASE ANSWER ALL QUESTIONS!
Let T : P(R) → P(R) be the linear map defined by T(p(x)) = xp′(x) (you...
Let T : P(R) → P(R) be the linear map defined by T(p(x)) = xp′(x) (you may take it for granted that T is linear). Show that for each λ ∈ Z with λ ≥ 0, λ is an eigenvalue of T , and xλ is a corresponding eigenvector.
Suppose T: P2(R) ---> P2(R) by T(p(x)) = x^2 p''(x) + xp'(x) and U : P2(R)...
Suppose T: P2(R) ---> P2(R) by T(p(x)) = x^2 p''(x) + xp'(x) and U : P2(R) --> R by U(p(x)) = p(0) + p'(0) + p''(0). a. Calculate U composed of T(p(x)) without using matricies. b. Assuming the standard bases for P2(R) and R find matrix representations of T, U, and U composed of T. c. Show through matrix multiplication that the matrix representation of U composed of T equals the product of the matrix representations of U and T.
ADVERTISEMENT
Need Online Homework Help?

Get Answers For Free
Most questions answered within 1 hours.

Ask a Question
ADVERTISEMENT