Difference between revisions of "Quadratic equation"

m (Factoring: Changed "By a well known theorem..." to "By the Zero Product Property...")
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A '''quadratic equation''' is an [[equation]] of the form <math> {a}{x}^2+{b}{x}+{c}=0</math>, where <math>a</math>, <math>b</math> and <math>c</math> are [[constant]]s and <math>x</math> is the unknown [[variable]].  Quadratic equations are solved using 3 main strategies: [[factoring]], [[completing the square]] and the [[quadratic formula]].
 
A '''quadratic equation''' is an [[equation]] of the form <math> {a}{x}^2+{b}{x}+{c}=0</math>, where <math>a</math>, <math>b</math> and <math>c</math> are [[constant]]s and <math>x</math> is the unknown [[variable]].  Quadratic equations are solved using 3 main strategies: [[factoring]], [[completing the square]] and the [[quadratic formula]].
 
  
 
=== Factoring ===
 
=== Factoring ===
 
 
The purpose of factoring is to turn a general quadratic into a product of [[binomial]]s. This is easier to illustrate than to describe.
 
The purpose of factoring is to turn a general quadratic into a product of [[binomial]]s. This is easier to illustrate than to describe.
  
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* [[Discriminant]]
 
* [[Discriminant]]
 
* [[Quadratic Inequality]]
 
* [[Quadratic Inequality]]
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[[Category:Definition]]

Revision as of 20:12, 21 April 2008

A quadratic equation is an equation of the form ${a}{x}^2+{b}{x}+{c}=0$, where $a$, $b$ and $c$ are constants and $x$ is the unknown variable. Quadratic equations are solved using 3 main strategies: factoring, completing the square and the quadratic formula.

Factoring

The purpose of factoring is to turn a general quadratic into a product of binomials. This is easier to illustrate than to describe.

Example: Solve the equation $x^2-3x+2=0$ for $x$. Note: This is different for all quadratics; we cleverly chose this so that it has common factors.

Solution: $x^2-3x+2=0$

First, we expand the middle term: $x^2-x-2x+2=0$.

Next, we factor out our common terms to get $x(x-1)-2(x-1)=0$.

We can now factor the $(x-1)$ term to get $(x-1)(x-2)=0$. By the zero-product property, either $(x-1)$ or $(x-2)$ equals zero.

We now have the pair of equations $x-1=0$ and $x-2=0$. These give us the answers $x=1$ and $x=2$, which can also be written as $x=\{1,\,2\}$. Plugging these back into the original equation, we find that both of these work! We are done.

Completing the square

Completing the square

Quadratic Formula

See Quadratic Formula.

See Also