Lineære ulikheter

$\begin{array}{rcl}x-3& < & 5\\ & & \\ x& <& 5+3\\ & & \\ x& <& 8\end{array}$

$\begin{array}{rcl}2x+1& > & 3\\ & & \\ 2x& >& 2\\ & & \\ x& >& 1\end{array}$

$\begin{array}{rcl}2x-4& < & x-4\\ & & \\ 2x-x& <& -4+4\\ & & \\ x& <& 0\end{array}$

$\begin{array}{rcl}3x-5& < & 5\\ & & \\ 3x& <& 10\\ & & \\ x& <& \frac{10}{3}\end{array}$

$\begin{array}{rcl}5x-3& < & 2x-6\\ & & \\ 5x-2x& <& -6+3\\ & & \\ 3x& <& -3\\ & & \\ x& <& -1\end{array}$

$\begin{array}{rcl}6-5x& \ge & 6\left(1-x\right)\\ & & \\ -5x+6x& \ge & 6-6\\ & & \\ x& \ge & 0\end{array}$

$\begin{array}{rcl}x-3& \le & 2\left(x+6\right)\\ & & \\ x-2x& \le & 12+3\\ & & \\ -x& \le & 15 \mathrm{Dividerer} \mathrm{på} (-1) \\ & & \mathrm{og} \mathrm{snur} \mathrm{ulikhetstegnet}\\ x& \ge & -15\end{array}$

$\begin{array}{rcl}3\left(x-5\right)& < & 5\left(x-2\right)\\ & & \\ 3x-15& <& 5x-10\\ & & \\ 3x-5x& <& -10+15\\ & & \\ -2x& <& 5 \mathrm{Dividerer} \mathrm{på} (-2) \\ & & \mathrm{og} \mathrm{snur} \mathrm{ulikhetstegnet}\\ x& >& -\frac{5}{2}\end{array}$

$\begin{array}{rcl}5x-3& < & 2x-6\\ & & \\ 5x-2x& <& -6+3\\ & & \\ 3x& <& -3\\ & & \\ x& <& -1\end{array}$

$\begin{array}{rcl}1-x& \ge & 1+x\\ & & \\ -x-x& \ge & 1-1\\ & & \\ -2x& \ge & 0 \mathrm{Dividerer} \mathrm{på} (-2) \\ & & \mathrm{og} \mathrm{snur} \mathrm{ulikhetstegnet}\\ x& \le & 0\end{array}$

$\begin{array}{rcl}3\left(2x-3\right)& < & 6x-9\\ & & \\ 6x-9& <& 6x-9\\ & & \\ 6x-6x& <& -9+9\\ & & \\ 0x& <& 0\end{array}$

$0x$ kan aldri bli mindre enn $0$. Det betyr at ulikheten ikke har løsning.

$\begin{array}{rcl}\frac{2}{3}x-2& \le & -3\\ & & \\ \frac{2x·3}{3}-2·3& \le & -3·3\\ & & \\ 2x-6& \le & -9\\ & & \\ 2x& \le & -3\\ & & \\ x& \le & -\frac{3}{2}\end{array}$

$\begin{array}{rcl}\frac{x}{2}-\frac{x}{3}& > & \frac{1}{6}\\ & & \\ \frac{x·6}{2}-\frac{x·6}{3}& >& \frac{1·6}{6}\\ & & \\ 3x-2x& >& 1\\ & & \\ x& >& 1\end{array}$

$\begin{array}{rcl}\frac{5}{2}x+\frac{x}{3}-\frac{7}{4}& \ge & 3-\frac{x}{6}\\ & & \\ \frac{5x·12}{2}+\frac{x·12}{3}-\frac{7·12}{4}& \ge & 3·12-\frac{x·12}{6}\\ & & \\ 30x+4x-21& \ge & 36-2x\\ & & \\ 36x& \ge & 57\\ & & \\ x& \ge & \frac{57}{36}\\ & & \\ x& \ge & \frac{19}{12} x\in \left[\frac{19}{12},\to \right.>\end{array}$

$\begin{array}{rcl}\frac{3}{2}\left(2x-3\right)& < & 9\left(\frac{x}{3}+\frac{1}{2}\right)\\ & & \\ \frac{6x}{2}-\frac{9}{2}& <& \frac{9x}{3}+\frac{9}{2}\\ & & \\ 3x-3x& <& \frac{9}{2}+\frac{9}{2}\\ & & \\ 0x& <& 9\end{array}$

$0x$ er alltid mindre enn $9$. Det betyr at ulikheten er gyldig for alle mulige $x$.

Vi lar $x$ være antall kurver Per plukker og setter opp uttrykk for hver av de to lønnsavtalene.

1) $50+2x$

2) $5x$

Vi får ulikheten

$\begin{array}{rcl}5x& > & 50+2x\\ & & \\ 3x& >& 50\\ & & \\ x& >& 16,7\end{array}$

Per må plukke minst 17 kurver i timen for at avtale 2) skal lønne seg.

Det er klart at hvis kjørelengden er mindre enn eller lik 500 kilometer så lønner 1) seg (lavere døgnpris). Kjørelengden må altså være høyere enn 500 kilometer for at 2) skal lønne seg. Vi lar x være antall kilometer de kjører over 500 kilometer og setter opp uttrykk for de to tilbudene.

1) $700·5+5x$

2) $1500·5$

Avtale 2) skal lønne seg . (Det betyr her at 2) skal gi lavest kostnad.)

Vi får

$\begin{array}{rcl}1500·5& < & 700·5+5x\\ & & \\ -5x& <& 3500-7500\\ & & \\ -5x& <& -4000\\ & & \\ x& >& 800\end{array}$

Det betyr at de må kjøre mer enn $800 \mathrm{km}+500 \mathrm{km}=1300 \mathrm{km}$ for at tilbud 2) skal lønne seg.