A quadratic expression is a polynomial that can be written in the form $ax^2+bx+c$ where $a,b,c\in \mathbb{R}$.
- That is, the coefficients in front of the $x$-stuff and at the end are any real numbers.
- Ex: $3.124x^2+\frac{1}{3}x-5$ is a quadratic expression.
Quadratic expressions also take the form $(ax+b)(cx+d)$. After FOILing, you will get an expression of the same form as the above. Notice that the highest power that you get (after FOILing) is $2$. This comes from multiplying the $x$’s as part of the FOILing process. This maximum power of $2$ is what makes the expression quadratic.
- To see this, try FOILing $(2x+4)(5x-2)$
Quadratic expressions can also have the form $(ax+b)^2+c$. Again, fully FOILing will give you an expression that has at most a power of $2$, making the expression quadratic.
- To see this, try expanding $(2x+5)^2+3$ and see what you get!

The following topics will talk about how we can factor many quadratic expressions. Remember throughout these topics that factoring is a means of “undoing” FOILing.

Lesson Content

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Factoring Quadratics where $a=1$

Factoring Harder Quadratics, where a isn’t 1

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