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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Can you increase the degree of a polynomial with integer coefficients while keeping the exact same roots?

Say I have a fifth degree polynomial $$z^5-5z^4-188z^3+986z^2+10152z-59696$$ with the roots $$ 7, 9-i,9 + i,-10 + 2i,-10 - 2i.$$ Say I want a sixth degree polynomial instead with the same roots. Can that be done?
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Finding the result of the polynomial

The question is that: Given that $x^2 -5x -1991 = 0$, what is the solution of $\frac{(x-2)^4 + (x-1)^2 - 1}{(x-1)(x-2)}$ I've tried to factorize the second polynomial like this: $\frac{(x-2)^4 + (x-1)^2 -…
user579861
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Find a new polynomial using vieta formula?

Given that $_{ }$$x^{4}+x^{3}+px^{2}+4x-2=0$ where $p$ is a constant, has roots $x_{1}, x_{2}, x_{3}\,and\,x_{4}$ a) Find the equation whose roots are $\frac{1}{x_{1}}, \frac{1}{x_{2}}, \frac{1}{x_{3}}\,and\,\frac{1}{x_{4}}$ b) Given that…
Jane T
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How Does One Write the Equation of a Transformed Function, Given the Transformation

After using my math textbook, Desmos and Photomath to determine the answer, I am still confused as to what the process is. E.g. If f(x) = x^4, determine the equation of the transformed function when y = -2f(2x+6)-4 is applied as the…
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On symmetric expressions of polynomials.

$\alpha, \beta, \gamma$ are the roots of equation $x^3+px^2+qx+r=0$ . Find $$\sum{\frac{\alpha^2 + \beta^2}{\alpha+\beta}}.$$ I can solve the symmetric expression by : $$\frac{\alpha^2 + \beta^2}{\alpha+\beta} = (\alpha+\beta) -\frac{2\alpha…
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Finding the value of a polynomial at certain points

$p(x)$ be a polynomial of degree 7 with real coefficients such that $p(π) = √3$ and $$\int_{-π}^{π} x^{k}p(x) = 0, \text{ for} \; 0\leq k \leq 6. $$ I have to find the value of $p(-π)$ and $p(0).$ My initial thoughts were to suppose that $p(x) = a_0…
hiren_garai
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Prove certain recursive functions are polynomials

Problem: Derive a formula for $\sum_{k=1}^n k^2$. Attempt: Let $f(n)$ be such a formula. Then we have the recursive formula $$\forall n\in\mathbb{N},\quad f(n+1)=f(n)+(n+1)^2$$ and the initial condition $f(1)=1$. We wish to prove that $f(n)$ is a…
user519413
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Solve polynomial equation with real parameter

Solve the equation $x^4-(2m+1)x^3+(m-1)x^2+(2m^2+1)x+m=0,$ where $m$ is a real parameter. My work: So far I've been able to factor the polynomial to $(-x^2+x+m)(-x^2+2mx+1)=0$. Then after using the quadratic formula with each of the factors I'm…
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How do I should that $x-1$ a factor of a positive degree polynomial?

I'm supposed to show that $x-1$ is a factor of a polynomial P of positive degree if and only if the sum of the coefficients of P is zero. How do I do that exactly?
Math Love
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Question about polynomial

If the polynomial $x^3+3px+q$ has a factor of the form $(x-a)^2$, then prove that $q^2+4p^3=0$.
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I need help with finding a polynomial and using it to find a perimeter

So I need help with this problem, I’m new to polynomials. Can you also explain how to get the answer? Find the polynomial that models the problem and use it to estimate the quantity: A rectangle has a length of $x$ and a width of $5x^3 + 4 - x^2$. …
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Real value of equation $(x-\frac{1}{x})^\frac{1}{2}+(1-\frac{1}{x})^\frac{1}{2}=x$

Find the real value of x in the equation $(x-\frac{1}{x})^\frac{1}{2}+(1-\frac{1}{x})^\frac{1}{2}=x$ I tried to square the whole term and after expansion not getting the result.
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Let $a$, $b$, $c$, $d$ be the roots of $x^4 + x + 1 = 0$. Find $a^4 + b^4 + c^4 + d^4$.

Let $p(x) = x^4 + x + 1 = 0$, and let $a$, $b$, $c$, $d$ be its roots. Find $a^4 + b^4 + c^4 + d^4$. I have no idea how to start solving this problem.
Md Masood
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Polynomial problem with two conditions

I have to find $P(0)$ from the polynomial with minimum degree given that $$(x-1)^3|(P(x)+1)$$ $$(x+1)^3|(P(x)-1)$$ Plugging in $x=\pm 1$ gets something nice, also division by a polynomial of third order gives successively: $$P(1)+1 =0; \…
user556151
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Roots of a polynomial are positive integers

Given $a_n$ is an integer with $a_{10} = 11, a_9 = -143$, determine the number of polynomial in the form of $$P(x) =\sum_{i=0}^{10} a_nx^n$$ such that the zeros of $P(x)$ are all positive integers. I have never encountered a problem like this, all I…
SuperMage1
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