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Questions tagged [cubics]

This tag is for questions relating to cubic equations, these are polynomials with $~3^{rd}~$ power terms as the highest order terms.

A cubic equation has the form $$ax^3 + bx^2 + cx + d = 0 $$ where $~a,~b,~c,~d~$ are complex numbers and $~a \ne 0~.$

By the Fundamental Theorem of Algebra, cubic equation always has $~3~$ roots, some of which might be equal. All cubic equations have either one real root, or three real roots.

All of the roots of the cubic equation can be found algebraically. The roots can also be found trigonometrically. Alternatively, numerical approximations of the roots can be found using root-finding algorithms such as Newton's method.

Applications:

Cubic equations arise in various other contexts.

  • Marden's theorem states that the foci of the Steiner inellipse of any triangle can be found by using the cubic function whose roots are the coordinates in the complex plane of the triangle's three vertices. The roots of the first derivative of this cubic are the complex coordinates of those foci.

  • The area of a regular heptagon can be expressed in terms of the roots of a cubic. Further, the ratios of the long diagonal to the side, the side to the short diagonal, and the negative of the short diagonal to the long diagonal all satisfy a particular cubic equation. In addition, the ratio of the inradius to the circumradius of a heptagonal triangle is one of the solutions of a cubic equation. The values of trigonometric functions of angles related to $~{\displaystyle 2\pi /7}~$ satisfy cubic equations.

  • Given the cosine (or other trigonometric function) of an arbitrary angle, the cosine of one-third of that angle is one of the roots of a cubic.

  • The solution of the general quartic equation relies on the solution of its resolvent cubic.

  • The eigenvalues of a $~3×3~$ matrix are the roots of a cubic polynomial which is the characteristic polynomial of the matrix.

  • The characteristic equation of a third-order linear difference equation or differential equation is a cubic equation.

  • In analytical chemistry, the Charlot equation, which can be used to find the pH of buffer solutions, can be solved using a cubic equation.

  • In chemical engineering and thermodynamics, cubic equations of state are used to model the PVT (pressure, volume, temperature) behavior of substances.

  • Kinematic equations involving changing rates of acceleration are cubic.

  • The speed of seismic Rayleigh waves is a solution of the Rayleigh wave cubic equation.

References:

https://en.wikipedia.org/wiki/Cubic_function

http://mathworld.wolfram.com/CubicFormula.html

http://www.mathcentre.ac.uk/resources/uploaded/mc-ty-cubicequations-2009-1.pdf

1396 questions
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What is an example of real application of cubic equations?

I didn't yet encounter to a case that need to be solved by cubic equations (degree three) ! May you give me some information about the branches of science or criterion deal with such nature ?
Fereydoon Shekofte
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4 answers

Motivation of Vieta's transformation

The depressed cubic equation $y^3 +py + q = 0$ can be solved with Vieta's transformation (or Vieta's substitution) $y = z - \frac{p}{3 \cdot z}.$ This reduces the cubic equation to a quadratic equation (in $z^3$). Is there any geometric or algebraic…
Martin Brandenburg
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2 answers

Cubic formula gives the wrong result (triple checked)

I'd like to solve $ax^3 + bx^2 + cx + d = 0$ using the cubic formula. I coded three versions of this formula, described in three sources: MathWorld, EqWorld, and in the book, "The Unattainable Attempt to Avoid the Casus Irreducibilis for Cubic…
PQR
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Using Vieta's theorem for cubic equations to derive the cubic discriminant

Background: Vieta's Theorem for cubic equations says that if a cubic equation $x^3 + px^2 + qx + r = 0$ has three different roots $x_1, x_2, x_3$, then $$\begin{eqnarray*} -p &=& x_1 + x_2 + x_3 \\ q &=& x_1x_2 + x_1x_3 + x_2x_3 \\ -r &=&…
Matt Gregory
  • 2,037
23
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7 answers

Integer solutions to $x^3=y^3+2y+1$?

Find all integral pairs $(x,y)$ satisfying $$ x^3=y^3+2y+1.$$ My approach: I tried to factorize $x^3-y^3$ as $$(x-y)(x^2 + xy + y^2)=2y+1,$$ but I know this is completely helpless. Please help me in solving this problem.
Identicon
  • 845
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11 answers

What equation produces this curve?

I'm working on an engineering project, and I'd like to be able to input an equation into my CAD software, rather than drawing a spline. The spline is pretty simple - a gentle curve which begins and ends horizontal. Is there a simple equation for…
Giffyguy
  • 679
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Can $x^3+3x^2+1=0$ be solved using high school methods?

I encountered the following problem in a high-school math text, which I wasn't able to solve using factorization/factor theorem: Solve $x^3+3x^2+1=0$ Am I missing something here, or is indeed a more advanced method necessary to solve this particular…
yroc
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6 answers

Solving $ax^3+bx^2+cx+d=0$ using a substitution different from Vieta's?

We all know, a general cubic equation is of the form $$ax^3+bx^2+cx+d=0$$ where $$a\neq0.$$ It can be easily solved with the following simple substitutions: $$x\longmapsto x-\frac{b}{3a}$$ We get, $$x^3+px+q=0$$ where, $p=\frac{3ac-b^2}{3a^2}$…
Learner
  • 805
18
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4 answers

Criteria for a number being a square-pyramidal number

The $n$-th square-pyramidal number is the sum of the first $n$ squares: $$ P_n = \sum_{k=1}^n k^2 = \frac{n(n+1)(2n+1)}6. $$ Suppose we have a number $K \in \mathbb{N}$. How can we test if $K$ is a square-pyramidal number, that is, $\exists n \in…
virchau13
  • 435
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4 answers

Why should it be $\sqrt[3]{6+x}=x$?

Find all the real solutions to: $$x^3-\sqrt[3]{6+\sqrt[3]{x+6}}=6$$ Can you confirm the following solution? I don't understand line 3. Why should it be $\sqrt[3]{6+x}=x$? Thank you. $$ \begin{align} x^3-\sqrt[3]{6+\sqrt[3]{x+6}} &= 6 \\ x^3 &= 6+…
user548054
17
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3 answers

How would you find the exact roots of $y=x^3+x^2-2x-1$?

My friend asked me what the roots of $y=x^3+x^2-2x-1$ was. I didn't really know and when I graphed it, it had no integer solutions. So I asked him what the answer was, and he said that the $3$ roots were $2\cos\left(\frac {2\pi}{7}\right),…
Frank
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The probability that a random (real) cubic has three real roots

We can formalize the notion of the probability that a randomly selected quadratic real polynomial has real roots as follows: Suppose $R > 0$, and suppose the random variables $a, b, c$ are (independently) uniformly distributed over the interval…
Travis Willse
  • 108,056
16
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8 answers

Does anyone have any cubics that are solvable by hand and yield "pretty" roots?

I've been playing around with Cardano's formula, and I've come away a little bit disappointed : I'm under the impression that for a polynomial with rational coefficients, the formulas yield an intractable mess unless either at least one root is…
Ert33
  • 559
16
votes
7 answers

Sum of cube roots of complex conjugates

When solving the following cubic equation: $$x^3 - 15x - 4 = 0$$ I got one of the solutions: $$x = \sqrt[3]{2 {\color{red}+} 11i} + \sqrt[3]{2 {\color{red}-} 11i}$$ When I calculated it with a hand calculator, it turned out to be exactly $4$. And…
BarbaraKwarc
  • 466
16
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4 answers

Is there anything like “cubic formula”?

Just like if we have any quadratic equation which has complex roots, then we are not able to factorize it easily. So we apply quadratic formula and get the roots. Similarly if we have a cubic equation which has two complex roots (which we know…
Atul Mishra
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