Faktorisering av andregradsuttrykk

$$ a=3, b=-4, c=3$$

$$ a=-1, b=2, c=-1$$

$$ a=1, b=3, c=0$$

$$ a=1, b=-1, c=0$$

$$ a=1, b=0, c=-4$$

$$ 36=2·2·3·3$$

$$ $ 18a^2{b}^3$=2·3·3·a·a·b·b·b$$

$$ $ 4x^2$=2·2·x·x$$

$$ $ 49a{b}^2$=7·7·a·b·b$$

$$ \begin{array}{rcl}$ 18x+9$ & =& 2·3·3·x+3·3\\ & =& 3·3·\left(2x+1\right)\\ & =& 9\left(2x+1\right)\end{array}$$

$$ \begin{array}{rcl}$ 4a^2-2a$ & =& 2·2·a·a-2·a\\ & =& 2a\left(2a-1\right)\end{array}$$

$$ $ -3a-6a^2$=-3a(1+2a)$$

$$ $ 3b^2-6b+18$=3\left(b^2-2b+6\right)$$

Vi bruker konjugatsetningen:

$$ $ x^2-1$=x^2-1^2=\left(x+1\right)\left(x-1\right)$$

Vi bruker konjugatsetningen:

$$ $ x^2-4$=x^2-2^2=\left(x+2\right)\left(x-2\right)$$

Vi bruker konjugatsetningen:

$$ $ x^2-9$=\left(x+3\right)\left(x-3\right)$$

Vi bruker konjugatsetningen:

$$ $ 4x^2-25$=\left(2x+5\right)\left(2x-5\right)$$

Vi setter 2 utenfor parentes før vi bruker konjugatsetningen:

$$ $ 2x^2-18$=2\left(x^2-9\right)=2\left(x+3\right)\left(x-3\right)$$

Vi bruker andre kvadratsetning:

$$ $ x^2-14x+49$=x^2-2·x·7+7^2={\left(x-7\right)}^2$$

Vi setter felles faktorer utenfor parentes og bruker konjugatsetningen:

$$ $ 3x^3-48x$=3x\left(x^2-16\right)=3x(x+4)(x-4)$$

Vi setter felles faktorer utenfor parentes og bruker konjugatsetningen:

$$ $ 18-2x^2$=2\left(9-x^2\right)=2\left(3+x\right)\left(3-x\right)$$

Vi bruker andre kvadratsetning:

$$ $ x^2-2x+1$=x^2-2·x·1+1^2={\left(x-1\right)}^2$$

Vi setter felles faktorer utenfor parentes og bruker første kvadratsetning:

$$ \begin{array}{rcl}$ 36+24b+4b^2$ & =& 4\left(9+6b+b^2\right)\\ & =& 4\left(3^2+2·3·b+b^2\right)\\ & =& 4{\left(3+b\right)}^2\end{array}$$

Vi bruker andre kvadratsetning:

$$ $ x^2-6x+9$=x^2-2·x·3+3^2={\left(x-3\right)}^2$$

Vi bruker konjugatsetningen:

$$ \begin{array}{rcl}$ {\left(x-2\right)}^2-36$ & =& {\left(x-2\right)}^2-6^2\\ & =& \left(\left(x-2\right)+6\right)·\left(\left(x-2\right)-6\right)\\ & =& \left(x+4\right)\left(x-8\right)\end{array}$$

Vi bruker konjugatsetningen:

$$ $ x^2-121$=\left(x+11\right)\left(x-11\right)$$

Vi bruker konjugatsetningen:

$$ $ x^2-144$=\left(x+12\right)\left(x-12\right)$$

Vi har at $$ 2=1·2$$ og $$ 1+2=3$$. Dette gir

$$ $ x^2+3x+2$ = (x+1)(x+2)$$

Vi har at $$ 6=1·6$$ og $$ 1+6=7$$. Dette gir

$$ \begin{array}{rcl}$ x^2+7x+6$ & =& x^2+(1+6)x+1·6\\ & =& (x+1)(x+6)\end{array}$$

$$ \begin{array}{rcl}$ x^2+9x+8$ & =& x^2+(1+8)x+1·8 \\ & =& (x+1)(x+8)\end{array}$$

$$ \begin{array}{rcl}$ x^2+10x-24$ & =& x^2+(12-2)x+12·(-2)\\ & =& (x+12)(x-2)\end{array}$$

$$ \begin{array}{rcl}$ x^2+14x+24$ & =& x^2+(2+12)x+2·12\\ & =& (x+2)(x+12)\end{array}$$

$$ \begin{array}{rcl}$ x^2-6x-16$ & =& x^2+(2-8)x+2·(-8)\\ & =& (x+2)(x-8)\end{array}$$

$$ \begin{array}{rcl}$ x^2-10x+24$ & =& x^2+(-4-6)x+(-4)·(-6)\\ & =& (x-4)(x-6)\end{array}$$

$$ \begin{array}{rcl}$ 2x^2-2x-4$ & =& 2(x^2-x-2)\\ & =& 2(x^2+(1-2)x+1·(-2)\\ & =& 2(x+1)(x-2)\end{array}$$

$$ \begin{array}{rcl}3x^2-3x-18 & =& 3(x^2-x-6)\\ & =& 3(x^2+(2-3)x+2·(-6)\\ & =& 3(x+2)(x-3)\end{array}$$

$$ \begin{array}{rcl}{x}^2+\frac{1}{2}x-\frac{1}{2} & =& x^2+\left(1-\frac{1}{2}\right)x+1·\left(-\frac{1}{2}\right)\\ & =& \left(x+1\right)\left(x-\frac{1}{2}\right)\end{array}$$

$$ \begin{array}{rcl}2x^2-x+1 & =& \hspace{0.17em}2\left(x^2-\frac{1}{2}x+\frac{1}{2}\right)\\ & =& 2\left(x^2+\left(-\frac{1}{4}-\frac{1}{4}\right)+\left(-\frac{1}{4}\right)·\left(-\frac{1}{4}\right)\right)\\ & =& 2{\left(x-\frac{1}{4}\right)}^2\end{array}$$