New posts in probability-distributions

Birthday problem expectation

probability probability-distributions solution-verification expected-value self-learning

Shtarkov sum approximation

probability probability-distributions asymptotics information-theory coding-theory

Kurtosis of Poisson Distribution [closed]

probability probability-distributions poisson-distribution

Intuition behind Variance formula [duplicate]

probability probability-distributions intuition

Distribution of the sum of squared independent normal random variables.

probability probability-distributions normal-distribution

Can a smooth probability density function on $\mathbb{R}^n$ have no local maxima?

multivariable-calculus probability-distributions maxima-minima

Get x value with given probability

probability discrete-mathematics probability-distributions gaussian

Probability of lamp after $10500$ h when already reached $9000$ h

probability discrete-mathematics probability-distributions gaussian

Sum of Bernoulli random variables with different success probabilities

probability probability-distributions

Quantile function properties

inequality probability-distributions

Limit using Poisson distribution [duplicate]

real-analysis probability-distributions

A fair die is rolled repeatedly. Let $X$ be the number of rolls needed to obtain a $5$ and $Y$ be the number of rolls needed to obtain as $6$.

probability probability-distributions conditional-probability

Expected number of occurrences of the pattern $HTH$ in $n$ independent coin tossings

probability probability-distributions expected-value

How does one generally find a joint distribution function (or density) from marginals when there is dependence?

probability probability-theory probability-distributions

If $X,Y$ are independent and geometric, then $Z=\min(X,Y)$ is also geometric

probability-theory probability-distributions random-variables

Same distribution with different probability density function

probability probability-distributions moment-generating-functions

Let $X$ be a random variable with Cauchy distribution, compute the density function of $Y=\frac{1}{1+X^2}$

probability probability-theory probability-distributions density-function

If $X,Y$ are independent $\chi ^2$ with $m$ and $n$ degrees of freedom, then $\frac{X}{X+Y} \sim\beta(m/2, n/2)$

probability probability-distributions density-function

Cramer Rao lower bound in Cauchy distribution

statistics probability-distributions statistical-inference expected-value

Show that a distribution function is dominated

probability measure-theory statistics probability-distributions