May 12, 2021 · Chebyshev's inequality says that the area in the red box is less than the area under the blue curve $f (x)$. The only issue with this picture is that, depending on $\lambda$ …

Regarding Chebyshev's and Markov's inequality. What is the relation (if any) between them? Which one is more strict (and in which situation)? Is there an easy way to understand what …

May 10, 2012 · I'm unaware of Chebyshev's inequality hence I can't do this question, can anyone help. Q) A company produces planks whose length is a random variable of mean 2.5m and …

Jan 6, 2020 · I am trying to figure out if Chebyshev polynomials are preferred over Legendre polynomials in function approximation. I read on several sources that Chebyshev Polynomials …

Aug 11, 2018 · Chebyshev's inequality application and convergence - practical example Ask Question Asked 7 years, 3 months ago Modified 7 years, 3 months ago

Jun 30, 2015 · It would be better to rephrase the question in more specific terms, like: "How to compute the Fourier-Chebyshev expansion of $\sin (x)$ and $\cos (x)$ over $ [-1,1]$?" - and …

Dec 18, 2015 · One cannot in general turn the Chebyshev Inequality into a correct one-sided inequality by simply dividing the tail probability by $2$. However, there are one-sided …

Mar 13, 2017 · Is there any intuition behind Chebyshev's inequality or is that only pure mathematics? What strikes me is that any random variable (whatever distribution it has) …

3 I want to use Chebyshev interpolation. But I am a little confused for finding Chebyshev nodes. I use the following figure to illustrate my problem. Consider I have a vector of numbers I …

Mar 26, 2021 · Explore related questions special-functions chebyshev-polynomials quadrature See similar questions with these tags.