New posts in roots

Why is the "r" doubled in "arrhythmia"? [duplicate]

orthography prefixes roots

Is Vieta the only way out?

algebra-precalculus polynomials roots

Why is it called hypochondria instead of hyperchondria? [closed]

word-choice roots

Coefficients of a polynomial also are the roots of the polynomial?

algebra-precalculus polynomials roots

The function $f'+f'''$ has at least $3$ zeros on $[0,2\pi]$.

real-analysis functions roots

Write $\sqrt{\dfrac{a}{5b}}$ without denominator under the radical sign

algebra-precalculus roots radicals

Number of real positive roots of a polynomial?

algebra-precalculus polynomials roots

How do iterative methods applied to the companion matrix of a polynomial $p(\lambda)$ relate to $p$ itself?

polynomials numerical-methods eigenvalues-eigenvectors roots companion-matrices

Relation between root systems and representations of complex semisimple Lie algebras

representation-theory lie-algebras roots root-systems

computing $A_2=\sum_{k=1}^{n}\frac{1}{(z_k-1)^2} $ and $\sum_{k=1}^n \cot^2\left( \frac{k\pi}{n+1}\right)$

complex-analysis algebra-precalculus complex-numbers summation roots

Why does Ridders' method work as well as it does?

numerical-methods roots

zeros of a polynomial

complex-analysis roots

Solve $ \left(\sqrt[3]{4-\sqrt{15}}\right)^x+\left(\sqrt[3]{4+\sqrt{15}}\right)^x=8 $ [closed]

roots square-numbers

Is the real solution of $\ln(x)=-e^x$ transcendental?

number-theory roots transcendental-numbers

Finding the all roots of a polynomial by using Newton-Raphson method.

polynomials numerical-methods roots complex-dynamics

Value of $(\alpha^2+1)(\beta^2+1)(\gamma^2+1)(\delta^2+1)$ if $z^4-2z^3+z^2+z-7=0$ for $z=\alpha$, $\beta$, $\gamma$, $\delta$

polynomials complex-numbers roots sums-of-squares

Why can't the quadratic formula be simplified to $x=\frac{-b\pm\sqrt{b^2-4ac}}{2a}=\frac{-b\pm(b-2)\sqrt{ac}}{2a}$?

algebra-precalculus roots quadratics radicals

What is the process/algorithm for extracting the nth root of x (x and n are integers)? [duplicate]

algorithms arithmetic roots

Can we prove that the solutions of $\int_0^y \sin(\sin(x)) dx =1$ are irrational?

calculus integration roots irrational-numbers

$f(x),g(x)$,2 quadratic polynomials:$|f(x)|≥|g(x)|∀x ∈ R$. Find the number of distinct roots of equation $h(x)h''(x)+(h'(x))^2=0$ if $h(x)=f(x)g(x)$

calculus polynomials roots quadratics