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 $R[X_1,\ldots,X_n]$.

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For multivariable polynomials: does the property ($P(x,y,z)=0 \Rightarrow Q(x,y,z) =0$) imply $P$ divides $Q$?

We all know that, for polynomial functions of one real variable, say $x$, if zeros of polynomial $P$ are a subset of zeros of polynomial $Q$, then $P$ divides $Q$. Assume that $P,Q$ are polynomials in several variables. For example, three: $P =…
PA6OTA
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How can sum of two polynomials be equal to $\sum_{k=0}^{MAX(n,m)} (a_{k}+b_{k})x^{k}$?

When we have two polynomials written in this form $\sum_{i=0}^{n} a_{i}x^{i} + \sum_{j=0}^{m} b_{j}x^{j}$, how can their sum be equal to $\sum_{k=0}^{MAX(n,m)} (a_{k}+b_{k})x^{k}$? If we take for example $n=3$ and $m=2$ we get: $\sum_{i=0}^{3}…
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Is it possible to perform polynomial composition on polynomials of $deg=0$?

I'm reading Barbeau's polynomials, and he states: For the polynomial $a_nt^n+a_{n-1}t^{n-1}+...+a_1t+a_0$, with $a_n \neq0 $, the numbers $a_i$ $(0 \leq i \leq n)$ are called coefficients. Some pages later, there's a question: Is $deg(p \circ…
Red Banana
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Smallest positive root of polynomial with bounded coefficients

Given is a positive integer $n$. A polynomial has all coefficients being integers whose absolute value does not exceed $n$. What is the smallest possible positive root, if there is any? If the root is rational, then by the rational root theorem, it…
pi66
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Solve $3a=(b+c+d)^3$ ,$3b=(c+d+e)^3$,.., $3e=(a+b+c)^3$

Find the real values of $a,b,c,d,e$ where $3a=(b+c+d)^3$, $3b=(c+d+e)^3$, $3c=(d+e+a)^3$, $3d=(e+a+b)^3$, $3e=(a+b+c)^3$. It is the problem. I have no idea about that. I tried to do this using basic algebra. I tried to use the methods of polynomials…
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Quotient of two polynomials with integer coefficients

Let $f(x)$ a polynomial with integer coefficients. If $r$ is an integral root of $f$, then prove that the polynomial $\frac{f(x)}{x-r}$ is also a polynomial with integer coefficients.
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Polynomials and division

I have had a problem with this question for a while now. The reason to be is that I do not understand what I have to do! The thing is we have been specifically told not to use long division. Here is the question: The polynomial $f(x)$ is given by…
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Proving a property of a peculiar polynomial

I want to show that we can find a real polynomial $p(y)$ such that $p\left(\frac{x-1}{x}\right) = \frac{x^n-1}{x^n}$ if and only if $n$ is an odd positive integer. I imagine starting with our assumption on $n$ would be the easier of the two paths…
Devon
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Why are $\sin3(\arcsin \, t) \: (-1\leq t\leq 1) $ and $\cos 4(\arccos \, t) \: (-1\leq t\leq 1) $ considered polynomials?

I'm reading Barbeau's Polynomials, and there's an exercise where he considers: $\sin3(\arcsin \, t) \: (-1\leq t\leq 1)\tag{1} $ $\cos 4(\arccos \, t) \: (-1\leq t\leq 1) \tag{2}$ As polynomials, but he doesn't consider: $\sin 2(\arcsin \, t) \:…
Red Banana
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Proof of the polynomial remainder theorem

My textbook states that $f(x)$ can always be written as $$f(x) = q(x)g(x) + r(x)$$ but it doesn't provide any proof of this and I cannot seem to find it anywhere. And what does it actually say, that there always must exist some combination of…
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Rational polynomial roots cover $\mathbb{R}$?

Let $p_d(x)$ be a polynomial of degree $d$ in one variable $x$, where the polynomial coefficients are in $\mathbb{Q}$. Let $R_d$ be the set of roots of all $p_d(x)=0$. Q. Is it the case that the roots $R_d$ of all those polynomials, $d \ge 0$, …
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What's The Remainder When Divided by (x-1)(x-2)

If a polynomial is divided by $(x-1)$ then remainder is 5 and if divided by $(x-2)$ the remainder is 7. What will be the remainder is the polynomial is divided by $(x-1)(x-2)$ ? As the degree is unknown so we can't write the polynomial with…
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Easy polynomials question?

Please do this without using the quadratic formula. If $\alpha$ and $\beta$ are zeroes of the polynomial $x^2 -6x + a$ then find the value of "$a$" if $3\times \alpha + 2\times \beta = 20$ Thank you for the help There is also a second question of…
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factor theorem with two variables

is it possible to use the factor theorem when there is more than one variable? I believe so; however, don't know how to check every case. Example: $x^2-y^2$
yiyi
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Leading coefficient of polynomial with more than one variable

What is the leading coefficient of a polynomial with more than one variable, when two or more terms have the same degree but different coefficients? For example: $3x^2y^2 + 5xy^3$. The degree is 4. Is the leading coefficient 3, 5, both,…
Becky
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