Baza ravnine

Zgled

Dan je pravokotnik $ABCD$. Z baznima vektorjema $\overset{\rightharpoonup}{a}=\overset{\Large\rightharpoonup}{AB}$ in $\overset{\rightharpoonup}{b}=\overset{\Large\rightharpoonup}{AC}$ izrazi vektorja $\overset{\Large\rightharpoonup}{BC}$ in $\overset{\Large\rightharpoonup}{BD}$.

Zgled

Katere trditve so pravilne?

Enotska vektorja določata bazo ravnine.

Nasprotna vektorja določata bazo ravnine.

Pravokotna vektorja določata bazo ravnine.

Vektorja, ki oklepata kot $60^\circ$, določata bazo ravnine.

Neničelna vektorja določata bazo ravnine.

Zgled

Dan je pravilni šestkotnik $ABCDEF$.

Če se da, zapiši vektor $\overset{\Large\rightharpoonup}{AD}$ kot linearno kombinacijo vektorjev:
a) $\overset{\rightharpoonup}{a}=\overset{\Large\rightharpoonup}{AB},\overset{\rightharpoonup}{b}=\overset{\Large\rightharpoonup}{BC}$ b) $\overset{\rightharpoonup}{a}=\overset{\Large\rightharpoonup}{AB},\overset{\rightharpoonup}{b}=\overset{\Large\rightharpoonup}{CD}$

c) $\overset{\rightharpoonup}{a}=\overset{\Large\rightharpoonup}{AB},\overset{\rightharpoonup}{b}=\overset{\Large\rightharpoonup}{CF}$ č) $\overset{\rightharpoonup}{a}=\overset{\Large\rightharpoonup}{AB},\overset{\rightharpoonup}{b}=\overset{\Large\rightharpoonup}{AC}$

Zgled

Ali dani vektorji v pravilnem šestkotniku $ABCDEF$ sestavljajo bazo ravnine? Odgovori z da/ne.

ne $\overset{\Large\rightharpoonup}{AB},\overset{\Large\rightharpoonup}{FC}$ da $\overset{\Large\rightharpoonup}{AB},\overset{\Large\rightharpoonup}{AD}$ ne $\overset{\Large\rightharpoonup}{AB},\overset{\Large\rightharpoonup}{AC},\overset{\Large\rightharpoonup}{AF}$

ne $\overset{\Large\rightharpoonup}{DE},\overset{\Large\rightharpoonup}{FF}$ da $\overset{\Large\rightharpoonup}{BD},\overset{\Large\rightharpoonup}{EC}$ ne $\overset{\Large\rightharpoonup}{FA}$