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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How to calculate complex roots of a polynomial

Calculate all complex roots of the polynomial: $8t^{4} -20t^{3} -10t^{2}-5t-3$. So thanks to matlab, I can easily find out that the roots are $t = 3, -0.5, \pm 0.5i$. Unfortunately, achieving this answer by hand has been more difficult. Apparently,…
ghshtalt
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What is the kernel and image of the derivative function?

The set $\mathbb R$[x] of polynomials in $x$ with real coefficients is a real vector space. The map $\delta$ : $\mathbb R$[x] $\to$ $\mathbb R$[x] is defined as follows: for $f$ $\in$ $\mathbb R$[x], define $\delta$($f$) = $df/dx$. That is,…
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Find the polynomial function q(z) of degree 6 when given 5 zeros

I was tasked to find the polynomial equation of the lowest possible degree with real coefficients, which had the zeros 2, 11-i and -4+2i. I did that by finding the conjugate forms of the last two zeros and find the polynomial by multiplying the…
Steve
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Is my general polynomial division correct?

I want to divide the general function $$ f(x) = \sum_{i = 0}^{n} a_i x^i $$ by $(x - x_0)$. Is my result correct? $$ f(x) = (x - x_0) \left(\sum_{i = 1}^n \sum_{j = i}^n (a_j x_0^{i - 1} x^{i - 1}) + \frac{\sum_{k = 0}^n \sum_{l = k}^n (a_k x_0^{l -…
Entimon
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How to Calculate $x^6+x^3y^3+y^6$

Given that $x,y$ real numbers such that : $x^2+xy+y^2=4$ And $x^4+x^2y^2+y^4=8$ How can one calculate : $x^6+x^3y^3+y^6$ Can someone give me hint .
user233658
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Any nonzero polynomial can be suitably modified to become everywhere nonzero on ${\mathbb Z}^n$?

If we have a "graded" sequence of polynomials $g_1\in {\mathbb C}(x_1),g_2\in {\mathbb C}(x_1,x_2),g_3\in {\mathbb C}(x_1,x_2,x_3) \ldots, g_n\in {\mathbb C}(x_1,x_2,\ldots,x_n)$ such that $g_i$ is non-constant in $x_i$ for each $i$, I call the map…
Ewan Delanoy
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When does an irreducible polynomial stay irreducible in a cyclotomic extension?

Suppose that $P(x)\in\mathbb{Q}[x]$ is irreducible over $\mathbb{Q}$, and let $K$ be the $n$-th cyclotomic field. Is there a simple criterion to tell if $P$ remains irreducible over $K$? (Preferably a necessary and sufficient condition, unlike…
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Prove that there is no integer k such that $f(k)=8$

Given, $f(x)=\sum_{i=0}^na_{i}x^{n-i}$ and $a_0=1$ have integral coefficients.If there exist four distinct integers a,b,c and d such that $f(a)=f(b)=f(c)=f(d)=5$,show that there is no integer $k$ such that $f(k)=8$ Source: An Excursion In…
gaufler
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How do I fit $f(x) = \exp(a+bx+cx^2 +dx^3)$ to two points? $x, f(x)$ and $f'(x)$ are known.

In the past I've fit polynomials by solving the set of equations. I can fit $f(x) = \exp(a+bx)$ to point $A$ and $B$ where I know $x$ and $f(x)$ for both points. If I want to fit to a specific gradient at point $A$ and $B$, I can use $f(x) =…
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polynomial of fifth degree

Prove that the largest number of real roots of the equation $ x^5+a_1x^4+a_2x^3+a_3x^2+a_4x+a_5=0$ whose coefficients are real,is three if $2a_1^2-5a_2<0.$ My attempt is: As coefficients are real,so complex roots will come in pair.Either one or…
Vinod Kumar Punia
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Question about quartic equation having all 4 real roots

I would appreciate if somebody could help me with the following problem.I am not good at quartic equations,so could not attempt much. Q:The number of integral values of $p$ for which the equation $x^4+4x^3-8x^2+p=0$ has all 4 real roots. Let…
Vinod Kumar Punia
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Proving that if $P(X)=a_n X^n+ \cdots+a_1 X + a_0$ has only real and simple roots then $a_{k-1}a_{k+1} \le a_k^2$

How to prove that if $P(X)=a_n X^n+ \cdots+a_1 X + a_0 \in \mathbb R[X]$ has only real and simple roots then $a_{k-1}a_{k+1} \le a_k^2$ for $1 \le k \le n-1$?
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Proof that every point can lie on a tangent to a curve

for which odd degree polynomials will every point in the plane lie on at least one tangent to the curve p(x)? What if P(x) is even?
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Bijections Between Different Branches of the Inverse of a Polynomial of a Single Complex Variable

Let $F\left(z\right)$ be a polynomial of degree $d≥2$ with complex coefficients. Let $D$ be an open disk in the complex plane containing no critical points of $F\left(z\right)$. Let $f\left(z\right)$ denote the inverse of $F\left(z\right)$; since…
Max
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How can I apply Newton's sums to solve this problem?

Given $x_1,x_2,x_3,x_4$ real numbers such that $x_1+x_2+x_3+x_4 = 0$ and $x_1^7+x_2^7+x_3^7+x_4^7 = 0,$ how can I use symmetric functions and Newton's sums to prove that $x_1(x_1+x_2)(x_1+x_3)(x_1+x_4)=0$? This is what I have so far: Note that $x_1…
Anonymous
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