Questions tagged [polynomials]

For both basic and advanced questions on polynomials in any number of variables, including, but not limited to solving for roots, factoring, and checking for irreducibility.

Usually, polynomials are introduced as expressions of the form $\sum_{i=0}^dc_ix^i$ such as $15x^3 - 14x^2 + 8$. Here, the numbers are called coefficients, the $x$'s are the variables or indeterminates of the polynomial, and $d$ is known as the degree of the polynomial. In general the coefficients may be taken from any ring $R$ and any finite number of variables is allowed. The set of all polynomials in $n$ variables $X_1,\ldots,X_n$ over a ring $R$ is denoted by $R[X_1,\ldots,X_n]$. Strictly speaking this is a formal sum, because the variables do not represent any value. Nevertheless, the variables of a polynomial obey the usual arithmetic laws in a ring (like commutativity and distributivity). This makes $R[X_1,\ldots,X_n]$ a ring itself. One should note that $R[X_1][X_2]=R[X_1,X_2]$. This idea can be extended to $R[X_1,\ldots,X_n]$ in a very natural way.

An expression of the form $rX_1^{i_1}X_2^{i_2}\cdots X_n^{i_n}$ ($r\in R$) is called a term (of the polynomial). Polynomials are defined to have only finitely many terms. An expression with infinitely many different terms is generally not considered to be a polynomial, but a (formal) power series in one or more variables.

When $P\in R[X]$, $P(x)$ is the evaluation of $P$ at $x$ (pronounced $P$ of $x$, or simply $Px$). Here $x$ does not necessarily have to be an element of $R$. For $P(x)$ to be properly defined for an $x$ in some ring $S$ we need:

  • a homomorphism $\phi:R\to S$
  • the image of all coefficients of $P$ under $\phi$ should commute with $x$.

Evaluation is now simply performed by replacing all coefficients $r_i$ of $P$ by $\phi(r_i)$ and all appearances of $X$ by $x$. This quite naturally gives an expression that is well defined as an element of $S$. The concept of evaluation is naturally extended to $R[X_1,\ldots,X_n]$.

26755 questions
4
votes
3 answers

Roots of a Polynomial Question

If $\alpha$ and $\beta$ are roots of the equation $x^2+mx+n=0$ , find the roots of $nx^2+(2n-m^2)x+n=0$ in terms of $\alpha$ and $\beta$. I really need help with this problem. I've started by finding the sum and products of roots of the first…
nick
  • 63
4
votes
1 answer

Finding a minimal polynomial for a square root of an algebraic number?

I have a given monic polynomial with an algebraic root $\alpha$. How can I find the minimal polynomial with a root of $\sqrt{1-\alpha^2}$ ?
Randall
  • 91
4
votes
2 answers

Find minimum value of $a^2+b^2$

Given that $a$ and $b$ are real constants and that the equation $x^4+ax^3+2x^2+bx+1=0$ has at least one real root, find the minimum possible value of $a^2+b^2$. I began this way: Let the polynomial be factorized as $(x^2+\alpha x + 1)(x^2+\beta x…
Yellow
  • 375
4
votes
1 answer

Two polynomials with complex coefficients whose level sets at $0$ and $1$ are the same

For a polynomial $f(X)\in \mathbb C[X]$, and $a\in \mathbb C$, let $f^{-1} (a):=\{\mu \in \mathbb C : f(\mu)=a\}$. Now let $f(X), g(X) \in \mathbb C[X]$ be non-constant polynomials such that $f^{-1}(0)=g^{-1}(0)$ and $f^{-1}(1)=g^{-1}(1)$, then…
user521337
  • 3,705
4
votes
5 answers

Determine if a polynomial has negative coefficients?

Given a polynomial with integer coefficients, is there an elegant way to determine if the polynomial has negative coefficients with minimum number of queries about the value of the polynomial at certain values. The value of the derivative of the…
4
votes
1 answer

What is a polynomial multiple?

This is probably a really simple thing, but I am unable to find a definition. I tried the internet and various textbooks. This arose from Axler's Linear Algebra done right 3rd. Example 3.103 He says that U is a subspace consisting of all polynomial…
Kabon
  • 63
  • 5
4
votes
2 answers

Find the result of the root expression, is my answer correct or not?

Suppose $a < 0 < b$. Then what is the result of: $\sqrt{(a-b)^2} + \sqrt[6]{ b^6 } = ?$ I have a solution but I can't be sure if I did a mistake, because I usually do! My solution: Call $a = -c$ for some $0 < c $. Then, $=\sqrt{(-c-b)^2} +…
FiveF
  • 43
4
votes
2 answers

Real root of $f(x) = 1+2x+3x^2 +4x^3$

Consider the polynomial $f(x) = 1+2x+3x^2 +4x^3$. Let $s$ be the sum of all distinct real roots of $f(x)$ and let $t = |s|$. The real number $s$ lies in the interval A) $\ \ (-\frac{1}{4},0)$ B) $ \ \ (−11,−\frac{3}{4}) $ C) $\ \…
4
votes
4 answers

Remainder when the polynomial $1+x^2+x^4+\cdots +x^{22}$ is divided by $1+x+x^2\cdots+ x^{11}$

Question : Find the remainder when the polynomial $1+x^2+x^4+\ldots +x^{22}$ is divided by $1+x+x^2+\cdots+ x^{11}$. I tried using Euclid's division lemma, I.e. $$P_1(x)=1+x^2+x^4+\cdots+x^{22}$$ $$P_2(x)=1+x+x^2+\cdots+x^{11}$$ Then for some…
Jaideep Khare
  • 19,293
4
votes
2 answers

There exists rational number $a_n$, $(x^2+\frac{1}{2}x+1)\mid(x^{2n}+a_nx^n+1)$

Let $n\in \mathbb{N}$. Prove that there exists a rational number $a_n$ for which $$(x^2+\frac{1}{2}x+1)\mid(x^{2n}+a_nx^n+1)$$ My attempt : I try $n=2$, $(x^2+\frac{1}{2}x+1)(x^2-\frac{1}{2}x+1)=x^4+\frac{7}{4}x^2+1$ $a_2 = \frac{7}{4}$
user403160
  • 3,286
4
votes
2 answers

let $f, g$ be two polynomial such that : $f(0)=-24 \ \ , \ \ g(0)=30$ and $\forall x \in \mathbb{R} : \ \ f(g(x))=g(f(x))$

let $f, g$ be two polynomial such that : $f(0)=-24 \ \ , \ \ g(0)=30$ and $$\forall x \in \mathbb{R} : \ \ f(g(x))=g(f(x))$$ then fine : $$ (f(3),g(6))=?$$ since : $$\forall x \in \mathbb{R} : \ \…
Almot1960
  • 4,782
  • 16
  • 38
4
votes
4 answers

Suppose that $P(x)$ is a polynomial of degree $n$ such that $P(k)=\frac{k^{2}}{k^{3}+1}$ for $k=0,1,\ldots,n$, find the value of $P(n+1)$

Suppose that $P(x)$ is a polynomial of degree $n$ such that $P(k)=\dfrac{k^{2}}{k^{3}+1}$ for $k=0,1,\ldots,n$. Find the value of $P(n+1)$ I tried by making a $f(x) = (x^3+1) P(x) - x^2$. But this equation will have $n+3$ roots, out of which $n+1$…
4
votes
5 answers

For a polynomial with integer coefficients, is it true that if constant term is prime then it cannot be the root of the polynomial.

For a polynomial with integer coefficients, is it true that if constant term is prime then it cannot be the root of the polynomial. Let $p$ be a polynomial with constant term $a_0$ and if $a_0$ is prime then $p(a_0) \ne 0$ I just thought of…
user312097
4
votes
1 answer

Polynomial remainder theorem

The polynomial, $f(x) = x^{2n} + px - 4$, where n and p are real constants, has a remainder of -8 when divided by $(x-1)$ and a remainder of 172 when divided by $(x+4)$. Find the values of n and p. I managed to solve for p, but got stuck when…
yzh1206
  • 43
4
votes
2 answers

What is the region in the coefficient plane such that $P(x)$ has no real roots?

Let $$P(x)=x^4+px^3+qx^2+px+1$$ where $p,q \in \mathbb{R}$. Let $\mathcal{R}$ be the region in the $pq$ - plane such that $P(x)$ has no real roots. Find the region $\mathcal{R}$. My Progress: Using the substitution $u=x+\frac{1}{x}$, we can reduce…
Trogdor
  • 10,331