Lösung 2.1:2c

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We obtain the answer by using the squaring rule, <math>(a+b)^2=a^2+2ab+b^2,</math> on the quadratic term and expanding the other bracketed terms
We obtain the answer by using the squaring rule, <math>(a+b)^2=a^2+2ab+b^2,</math> on the quadratic term and expanding the other bracketed terms
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{{Displayed math||<math>\begin{align}
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{{Abgesetzte Formel||<math>\begin{align}
(3x+4)^2&-(3x-2)(3x-8)\\
(3x+4)^2&-(3x-2)(3x-8)\\
&=\big( (3x)^2+2\cdot 3x \cdot 4 +4^2 \big) - (3x\cdot 3x-3x\cdot 8 - 2\cdot 3x+ 2\cdot 8)\\
&=\big( (3x)^2+2\cdot 3x \cdot 4 +4^2 \big) - (3x\cdot 3x-3x\cdot 8 - 2\cdot 3x+ 2\cdot 8)\\

Version vom 08:21, 22. Okt. 2008

We obtain the answer by using the squaring rule, \displaystyle (a+b)^2=a^2+2ab+b^2, on the quadratic term and expanding the other bracketed terms

\displaystyle \begin{align}

(3x+4)^2&-(3x-2)(3x-8)\\ &=\big( (3x)^2+2\cdot 3x \cdot 4 +4^2 \big) - (3x\cdot 3x-3x\cdot 8 - 2\cdot 3x+ 2\cdot 8)\\ &= (9x^2+24x+16)-(9x^2-24x-6x+16)\\ &=(9x^2+24x+16)-(9x^2-30x+16)\\ &=(9x^2+24x+16)-9x^2+30x-16\\ &=9x^2-9x^2+24x+30x+16-16\\ &=0+54x+0\\ &= 54x\,\textrm{.} \end{align}