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 $\lambda$ and $f$, you …

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 they express (kind of …

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 standard …

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 yield a …

Jan 9, 2024 · What distinguishes Chebyshev interpolation using Lagrange polynomials at Chebyshev points, and what advantages does it offer over traditional Lagrange interpolation with equispaced …

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 add your …

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) applies to that.

Mar 26, 2021 · special-functions chebyshev-polynomials quadrature Share Cite asked Mar 26, 2021 at 12:05

May 26, 2021 · And I know the Chebyshev interpolant has the good behavior. My question is if the Chebyshev interpolant is the best uniform approximation in some special cases? What the …

Oct 1, 2016 · One sided Chebyshev's inequality Ask Question Asked 9 years, 2 months ago Modified 4 years ago