Difference between revisions of "Cubic Equation"
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− | A cubic equation is an equation of the form: | + | A '''cubic equation''' is an equation of the form: |
<math>ax^3 + bx^2 + cx + d = 0</math>. | <math>ax^3 + bx^2 + cx + d = 0</math>. | ||
− | A cubic equation has 3 roots, either all real OR one real, two complex. | + | A cubic equation has 3 [[roots]], either all [[real number|real]] OR one real, two [[complex number|complex]]. |
==Solving Cubic Equations== | ==Solving Cubic Equations== | ||
− | You start with the equation <math>ax^3 + bx^2 + cx + d = 0</math>. | + | If you're too lazy to follow, look at subsection "TLDR" for each section. |
+ | ===Converting to a Depressed Equation=== | ||
+ | You start with the [[equation]] <math>ax^3 + bx^2 + cx + d = 0</math>. | ||
Divide both sides by a: <math>x^3 + \frac{b}{a}x^2 + \frac{c}{a}x + \frac{d}{a}</math>. | Divide both sides by a: <math>x^3 + \frac{b}{a}x^2 + \frac{c}{a}x + \frac{d}{a}</math>. | ||
− | Now we change the coefficient of <math>x^2</math> to <math>0</math> (e.g. change it to a depressed cubic). We do this by substituting <math> | + | Now we change the [[coefficient]] of <math>x^2</math> to <math>0</math> (e.g. change it to a depressed cubic). We do this by [[substitution|substituting]] <math>x = y - \frac{b}{3a}</math>, giving: |
<math>\left(y - \frac{b}{3a}\right)^3 + \frac{b}{a}\left(y - \frac{b}{3a}\right)^2 + \frac{c}{a}\left(y - \frac{b}{3a}\right) + \frac{d}{a} = 0</math> | <math>\left(y - \frac{b}{3a}\right)^3 + \frac{b}{a}\left(y - \frac{b}{3a}\right)^2 + \frac{c}{a}\left(y - \frac{b}{3a}\right) + \frac{d}{a} = 0</math> | ||
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<math>\left(\frac{3ac - b^2}{3a^2}\right)</math> is <math>p</math> and <math>\left(\frac{2b^3 - 9abc + 27a^2d}{27a^3}\right)</math> is <math>q</math>, so now we have <math>y^3 + py + q = 0</math>. | <math>\left(\frac{3ac - b^2}{3a^2}\right)</math> is <math>p</math> and <math>\left(\frac{2b^3 - 9abc + 27a^2d}{27a^3}\right)</math> is <math>q</math>, so now we have <math>y^3 + py + q = 0</math>. | ||
+ | |||
+ | ====TLDR?==== | ||
+ | |||
+ | The equation is <math>y^3 + py + q = 0</math> where <math>p = \left(\frac{3ac - b^2}{3a^2}\right)</math> and <math>q = \left(\frac{2b^3 - 9abc + 27a^2d}{27a^3}\right)</math>. | ||
+ | |||
+ | ===Solving the Depressed Equation=== | ||
Now here comes the smart part. Substitute <math>y = \sqrt[3]{u} - \sqrt[3]{v}</math>. | Now here comes the smart part. Substitute <math>y = \sqrt[3]{u} - \sqrt[3]{v}</math>. | ||
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<math>u - v - (3\sqrt[3]{uv} - p)(\sqrt[3]{u} - \sqrt[3]{v}) = -q</math> | <math>u - v - (3\sqrt[3]{uv} - p)(\sqrt[3]{u} - \sqrt[3]{v}) = -q</math> | ||
− | We want that last term to equal <math>0</math>, so we can set <math>3\sqrt[3]{uv} - p = 0</math>. (We can't use <math>\sqrt[3]{u} - \sqrt[3]{v} = 0</math>, because then <math>y = 0</math>, which is not necessarily true.) Solving this equation gives us <math>uv = \frac{p^3}{27}</math>. If <math>uv = \frac{p^3}{27}</math>, then <math>v - u = q</math>. We now have a system of equations: | + | We want that last term to equal <math>0</math>, so we can set <math>3\sqrt[3]{uv} - p = 0</math>. (We can't use <math>\sqrt[3]{u} - \sqrt[3]{v} = 0</math>, because then <math>y = 0</math>, which is not necessarily true.) Solving this equation gives us <math>uv = \frac{p^3}{27}</math>. If <math>uv = \frac{p^3}{27}</math>, then <math>v - u = q</math>. We now have a [[system of equations]]: |
<math>\begin{cases} uv = \frac{p^3}{27} \\ v - u = q \end{cases}</math>. | <math>\begin{cases} uv = \frac{p^3}{27} \\ v - u = q \end{cases}</math>. | ||
− | We can solve this via the [[quadratic formula]]. After <math>u</math> and <math>v</math> are obtained, we have <math>y = \sqrt[3]{u} - \sqrt[3]{v}</math> and <math>x = \sqrt[3]{u} - \sqrt[3]{v} - \frac{b}{3a}</math>. ( | + | We can solve this via the [[quadratic formula]]. After <math>u</math> and <math>v</math> are obtained, we have <math>y = \sqrt[3]{u} - \sqrt[3]{v}</math> and <math>x = \sqrt[3]{u} - \sqrt[3]{v} - \frac{b}{3a}</math>. |
+ | |||
+ | ====TLDR?==== | ||
+ | <math>x = \sqrt[3]{u} - \sqrt[3]{v} - \frac{b}{3a}</math> where u and v are roots of the system <math>\begin{cases} uv = \frac{p^3}{27} \\ v - u = q \end{cases}</math>. | ||
+ | |||
+ | ==The [[Cubic formula]]== | ||
+ | The cubic formula can be obtained by using the above method. These are the steps: | ||
+ | |||
+ | The depressed cubic is of the form <math>y^3 + \left(\frac{3ac - b^2}{3a^2}\right)y + \left(\frac{2b^3 - 9abc + 27a^2d}{27a^3}\right) = 0</math>. | ||
+ | |||
+ | <math>u</math> and <math>v</math> are the roots of the system of equations <math>\begin{cases} uv = \frac{p^3}{27} \\ v - u = q \end{cases}</math>. We can solve this by substitution: | ||
+ | |||
+ | <math>v = q + u</math> (We are still using p and q because they might get a little messy if we use p and q in terms of a, b, c, and d.) | ||
+ | |||
+ | <math>u(q + u) = \frac{p^3}{27}</math> | ||
+ | |||
+ | <math>u^2 + qu - \frac{p^3}{27} = 0</math> | ||
+ | |||
+ | <math>u = \frac{-q \pm \sqrt{\frac{27q^2 - 4p^3q}{27}}}{2}</math> | ||
+ | |||
+ | <math>v = \frac{q \pm \sqrt{\frac{27q^2 - 4p^3q}{27}}}{2}</math> (comes from <math>q + u</math>) | ||
+ | |||
+ | <math>y = \sqrt[3]{\frac{-q \pm \sqrt{\frac{27q^2 - 4p^3q}{27}}}{2}} - \sqrt[3]{\frac{q \pm \sqrt{\frac{27q^2 - 4p^3q}{27}}}{2}}</math> | ||
+ | |||
+ | <math>x = \sqrt[3]{\frac{-q \pm \sqrt{\frac{27q^2 - 4p^3q}{27}}}{2}} - \sqrt[3]{\frac{q \pm \sqrt{\frac{27q^2 - 4p^3q}{27}}}{2}} - \frac{b}{3a}</math> | ||
+ | |||
+ | <math>x = \sqrt[3]{\frac{-\left(\frac{2b^3 - 9abc + 27a^2d}{27a^3}\right) \pm \sqrt{\frac{3\left(\frac{2b^3 - 9abc + 27a^2d}{9a^3}\right)^2 - 4\left(\frac{3ac - b^2}{3a^2}\right)^3\left(\frac{2b^3 - 9abc + 27a^2d}{27a^3}\right)}{27}}}{2}}</math> | ||
+ | |||
+ | <math>- \sqrt[3]{\frac{\left(\frac{2b^3 - 9abc + 27a^2d}{27a^3}\right) \pm \sqrt{\frac{3\left(\frac{2b^3 - 9abc + 27a^2d}{9a^3}\right)^2 - 4\left(\frac{3ac - b^2}{3a^2}\right)^3\left(\frac{2b^3 - 9abc + 27a^2d}{27a^3}\right)}{27}}}{2}} - \frac{b}{3a}</math> | ||
+ | |||
+ | (See? I told you it would be messy.) I'm not going to simplify all that squaring and cubing right now: maybe soon! Also, if you select <math>+</math> for the first equation and <math>-</math> for the second (or vice versa--they lead to the same number), you will always get a real number. | ||
+ | |||
+ | One last piece of advice: '''''Don't try to memorize this.''''' Memorize the process (shortcut: just look at TLDR for each section). [[Cubic polynomial|Here]] is another way to do it. | ||
+ | |||
+ | ===If you're just asking for the formula for a monic cubic...=== | ||
+ | |||
+ | Here is the formula for <math>x^3 + ax^2 + bx + c</math>: | ||
+ | <math>x = \sqrt[3]{\frac{-\left(\frac{2a^3 - 9ab + 27c}{27}\right) \pm \sqrt{\frac{3\left(\frac{2a^3 - 9ab + 27c}{9}\right)^2 - 4\left(\frac{3b - a^2}{3}\right)^3\left(\frac{2a^3 - 9ab + 27c}{27}\right)}{27}}}{2}} - \sqrt[3]{\frac{\left(\frac{2a^3 - 9ab + 27c}{27}\right) \pm \sqrt{\frac{3\left(\frac{2a^3 - 9ab + 27c}{9}\right)^2 - 4\left(\frac{3b - a^2}{3}\right)^3\left(\frac{2a^3 - 9ab + 27c}{27}\right)}{27}}}{2}} - \frac{a}{3}</math> | ||
+ | |||
+ | ===If you're asking for the formula for a depressed monic cubic...=== | ||
+ | |||
+ | Here is the formula for <math>x^3 + ax + b</math>: | ||
+ | <math>x = \sqrt[3]{\frac{-b \pm \sqrt{\frac{27b^2 - 4a^3b}{27}}}{2}} - \sqrt[3]{\frac{b \pm \sqrt{\frac{27b^2 - 4a^3b}{27}}}{2}}</math> | ||
+ | |||
+ | [[category:Algebra]] |
Latest revision as of 11:16, 27 September 2024
A cubic equation is an equation of the form:
.
A cubic equation has 3 roots, either all real OR one real, two complex.
Contents
Solving Cubic Equations
If you're too lazy to follow, look at subsection "TLDR" for each section.
Converting to a Depressed Equation
You start with the equation .
Divide both sides by a: .
Now we change the coefficient of to (e.g. change it to a depressed cubic). We do this by substituting , giving:
.
is and is , so now we have .
TLDR?
The equation is where and .
Solving the Depressed Equation
Now here comes the smart part. Substitute .
The equation becomes . Simplification:
We want that last term to equal , so we can set . (We can't use , because then , which is not necessarily true.) Solving this equation gives us . If , then . We now have a system of equations:
.
We can solve this via the quadratic formula. After and are obtained, we have and .
TLDR?
where u and v are roots of the system .
The Cubic formula
The cubic formula can be obtained by using the above method. These are the steps:
The depressed cubic is of the form .
and are the roots of the system of equations . We can solve this by substitution:
(We are still using p and q because they might get a little messy if we use p and q in terms of a, b, c, and d.)
(comes from )
(See? I told you it would be messy.) I'm not going to simplify all that squaring and cubing right now: maybe soon! Also, if you select for the first equation and for the second (or vice versa--they lead to the same number), you will always get a real number.
One last piece of advice: Don't try to memorize this. Memorize the process (shortcut: just look at TLDR for each section). Here is another way to do it.
If you're just asking for the formula for a monic cubic...
Here is the formula for :
If you're asking for the formula for a depressed monic cubic...
Here is the formula for :