Lösung 2.1:4c
Aus Online Mathematik Brückenkurs 1
K (Lösning 2.1:4c moved to Solution 2.1:4c: Robot: moved page) |
|||
| Zeile 1: | Zeile 1: | ||
| - | {{ | + | Instead of multiplying together the whole expression, and then reading off the coefficients, we investigate which terms from the three brackets together give terms in |
| - | < | + | <math>x^{1}</math> |
| - | {{ | + | and |
| + | <math>x^{2}</math>. | ||
| + | |||
| + | If we start with the term in | ||
| + | <math>x</math>, we see that there is only one combination of a term from each bracket | ||
| + | which, when multiplied, gives | ||
| + | <math>x^{1}</math>, | ||
| + | |||
| + | |||
| + | <math>\left( x-x^{3}+x^{5} \right)\left( 1+3x+5x^{2} \right)\left( 2-7x^{2}-x^{4} \right)=...+x\centerdot 1\centerdot 2+...</math> | ||
| + | |||
| + | so, the coefficient in front of | ||
| + | <math>x</math> | ||
| + | is | ||
| + | <math>1\centerdot 2=2</math>. | ||
| + | |||
| + | As for | ||
| + | <math>x^{2}</math>, we also have only one possible combination: | ||
| + | |||
| + | |||
| + | <math>\left( x-x^{3}+x^{5} \right)\left( 1+3x+5x^{2} \right)\left( 2-7x^{2}-x^{4} \right)=...+x\centerdot 3x\centerdot 2+...</math> | ||
| + | |||
| + | |||
| + | The coefficient in front of | ||
| + | <math>x^{2}</math> | ||
| + | is | ||
| + | <math>3\centerdot 2=6</math> | ||
Version vom 14:36, 15. Sep. 2008
Instead of multiplying together the whole expression, and then reading off the coefficients, we investigate which terms from the three brackets together give terms in \displaystyle x^{1} and \displaystyle x^{2}.
If we start with the term in \displaystyle x, we see that there is only one combination of a term from each bracket which, when multiplied, gives \displaystyle x^{1},
\displaystyle \left( x-x^{3}+x^{5} \right)\left( 1+3x+5x^{2} \right)\left( 2-7x^{2}-x^{4} \right)=...+x\centerdot 1\centerdot 2+...
so, the coefficient in front of \displaystyle x is \displaystyle 1\centerdot 2=2.
As for \displaystyle x^{2}, we also have only one possible combination:
\displaystyle \left( x-x^{3}+x^{5} \right)\left( 1+3x+5x^{2} \right)\left( 2-7x^{2}-x^{4} \right)=...+x\centerdot 3x\centerdot 2+...
The coefficient in front of
\displaystyle x^{2}
is
\displaystyle 3\centerdot 2=6
