De cirkel 2B (Jorn van Parys)
Opdracht 1:
a) Teken een cirkel met straal 2 cm. Dit doe je met de knop
(Eenmaal klikken en dan 2 intikken).
b) Zet nu een punt op de cirkel zelf. Dit doe je met de knop
c) Verbind nu het middelpunt met je nieuw punt. Dit doe je met de knop
d) Toon het resultaat aan mr. Jorn.
Dit moet eruit zien als de afbeelding hieronder:
Vraag 1
De lijn die je getekend hebt is de ...
Opdracht 2:
a) Teken een cirkel met straal 3 cm. Dit doe je met de knop
b) Zet weer een punt op de cirkel. Dit doe je met de knop
c) Teken nu een rechte door de twee punten met de knop
d) Toon het resultaat aan mr. Jorn.
Je afbeelding moet er zo uitzien:
![](data:image/png;base64,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)
Vraag 2
De lijn die je getekend hebt is de ...
Opdracht 3:
a) Teken een cirkel met straal 2 cm. Dit doe je met de knop
b) Teken een punt op de cirkel met de knop
c) Teken nu (net zoals in de vorige oefening een rechte door je middelpunt en je nieuw punt met de knop
d) Teken nu een nieuw punt op de cirkel en je nieuwe lijn met de knop
. Je klikt eerst op de cirkel en dan op de lijn.
e) Selecteer de knop
en klik op de twee punten die op de cirkel liggen. Er verschijnt nu een nieuwe lijn bovenop je oude lijn. Je ziet die nu nog niet.
d) Klik met je rechtermuisknop (op een chromebook met je twee vingers op het touchpad) op de lijn buiten de cirkel. Vink het vakje weg die zegt 'toon object'.
e) Toon je resultaat aan mr. Jorn.
Je afbeelding ziet er zo uit:
![](data:image/png;base64,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)
Vraag 3
Het lijnstuk dat overblijft binnen de cirkel heten we de ...