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Browse High School Polynomials
Stars indicate particularly interesting answers or
good places to begin browsing.
Selected answers to common questions:
Completing the square.
Quadratic equations.
 Partial Fractions [01/29/1998]

How do I express 3/1(x^3) in partial fractions?
 Partial Fractions [11/23/2003]

I need to put this fraction into power series formation: (3x^2  x)/(x^3  x^2  x + 1). I've tried to use partial fractions but keep getting stuck.
 Pascal's Triangle and Binomial Expansions [09/01/1997]

I need to use Pascal's triangle to write out the binomial expansion of
something like (X+Y)^6.
 Polynomial and Remainder [02/19/1998]

An unknown polynomial f(x) of degree 37 yields a remainder of 1 when
divided by x1...
 Polynomial Degrees and Definition of a Field [03/02/1998]

The degree of polynomials added together, and definition of a field.
 Polynomial Division Compared with Long Division [02/01/2009]

I'm having difficulty grasping the concept of polynomial division.
 Polynomial Expansion [02/06/2003]

What's the general formula for things like (a+b+c)^2; (a+b+c+d)^3; (a+
b+c+d+e)^4; (...n+1 terms...)^nth power?
 Polynomial Factoring Rules [04/02/1997]

How do I apply the polynomial factoring rules to t^21+1 and 25y^2144 =
0?
 A Polynomial Has Third Degree, and Symmetry ... [07/02/2013]

Given the roots r, s, and t of a thirddegree polynomial in one variable, a teacher
struggles to find an expression in terms of its coefficients for (1 + r^3)(1 +
s^3)(1 + t^3). Doctor Jacques exploits the function's symmetry and invokes
Viete's formulas to show the way.
 A Polynomial in Three Variables with Few Integer Solutions [03/12/2011]

A student seeks proof that a polynomial in n and two other variables has no integer solutions. After a little insight from modular arithmetic and a lot of searching with a computer algebra system, Doctor Vogler turns up many solutions.
 Polynomial Long Division [12/03/2001]

Why in some questions (e.g. b^9+6b^6+b^4+9b^3+4b+8 by b^3+4) do you need
to add place holders?
 Polynomial Long Division [03/17/2004]

Use long divion to divide (2x  3) into 4x^4  x^2  2x + 1. I really
need help in doing this.
 Polynomial Problems [12/4/1995]

1. Let m,n and o be the 3 distinct roots of x^3 + ax + b = 0. 2. Compute
(mn)^2(no)^2(om)^2 in terms of a and b.... 3. Solve 2x^3  3x^2 + 1 =
0....
 Polynomial Roots [6/20/1996]

Is there a reliable method to find polynomial roots?
 Polynomials of the Fifth Degree and Above [07/28/2001]

I know how to find the root of a polynomial of the form: ax^2+bx+c=0. But
what about a polynomial of the third degree?
 Proof of a Positive and Infinitely Small Polynomial [4/10/1995]

Prove that there exists a two variable polynomial W(x,y) such that for
any x and y it is always positive but at the same time infinitely small.
 Proof of Successive Differences and the Degree of a Polynomial [06/26/2007]

Given a sequence of numbers, I know that by finding successive
differences between terms I eventually get a constant difference, and
that the number of differences needed to get to the constant is the
degree of the polynomial that defines the sequence. Can you prove why
that works?
 Proof That 3 = 0? [10/28/2006]

Starting with x^2 + x + 1 = 0 and using algebraic manipulations, I
seem to be showing that 3 = 0. Where am I going wrong?
 Proving that f = O(g) Whenever deg(f) <= deg(g) [04/20/2010]

A student seeks formal proof that f(n) = O(g(n)) whenever f(n) and g(n) are
polynomials with deg(f) <= deg(g). Doctor Vogler suggests one method for working up
to a proof, then obliges with a general strategy that makes use of the sum of the
absolute values of all of the coefficients of f(n).
 Quadratic Equation [7/10/1996]

Why is a quadratic equation "quadratic"?
 Quadratic Equations [12/3/1995]

My students want to know why an equation of the second degree is referred
to as a quadratic equation. What does the prefix quad have to do with
second degree equations?
 Quadratic Formulas, Equations, Parabolas, Graphing [6/16/1996]

Given 6x^2 + x  1 = 0, how do I find the roots, the vertex, some
coordinates, and from these graph it?
 Quadratic Function [05/04/2001]

What are the effects of changing the values of a, b, and c in a quadratic
function?
 Quadratic Inequalities [03/18/2003]

When I solve (x^2 + 1)/4 greater than or equal to (x + 2)/2 , of my
final two answers, only one works.
 Quadratic Interpolation [03/27/2003]

How do I come up with this polynomial? y = [(x  x2)(x  x3)]/[(x1 
x2)(x1  x3)]*y1 + [(x  x1)(x  x3)]/[(x2  x1)(x2  x3)]*y2 + [(x  x1)(x  x2)]/
[(x3  x1)(x3  x2)]*y3.
 Quadratics with Odd Coefficients [06/24/2003]

Show that quadratics with odd coefficients have no rational roots.
 Quadrinomials [02/26/2001]

What is a quadrinomial, and how is it used?
 Quick Way to Expand Binomials Raised to Powers [11/03/2006]

For a binomial expansion like (x+y)^5, I have an easy way to calculate
the coefficients without using the standard factorial method or
Pascal's triangle.
 Quick Way to Expand Large Polynomial Expressions [05/27/2008]

Find the first three terms of the expansion of (x2)^4*(x+1)^8.
 Rational Expressions [01/06/2002]

How do I know when I need to factor and when I don't, and if there are
the same polynomials, trinomials, etc., can I cancel them out at all
times? What are the restrictions on simplified expressions?
 Rationalizing Denominators with Cube Roots [06/26/2008]

How do you rationalize the denominator of a fraction with multiple
cube roots like 1/[cubrt(6) + cubrt(9) + cubrt(4)]?
 Rational Root Theorem [08/27/1998]

List all possible rational zeros of the each function, then determine the
rational zeros: f(x) = x^3  4x^2 + x + 2.
 Rational Root Theorem [03/02/1999]

Find all possible rational roots of 4x^3 + 3x^2 + 6x + 10.
 Rearranging a Polynomial [02/23/2002]

How do you do this question: 2n^2 + y^2 = 66^2 ?
 Reducing Algebraic Fractions by Cancelling [03/16/2004]

When reducing fractions, how come you can cancel factors but you can't
cancel terms? Can you please explain, hopefully with examples too?
 Remainder and Factor Theorem [01/29/1998]

When the polynomial p(x) is divided by (x1), the remainder is 5 and
when p(x) is divided by (x2), the remainder is 7. Find the remainder
when p(x) is divided by (x1)(x2).
 Restrictions [04/12/2003]

What is the point of restrictions if I can create any one that I
want?
 Root Multiplicity and Polynomial Functions [11/16/1997]

What effect does multiplicity [e.g. (x+1)(x2)^2 where 1 has a
multiplicity of 1 and 2 of 2] have on a polynomial function?
 Roots and the Bisection Method [08/01/1998]

What is the Bisection Method? How would I use it to find the roots of a
polynomial?
 Roots of a Cubic Equation [05/14/1997]

Find the roots of the cubic equation x^3 = 15x+4 using Cardona's formula.
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