PAU 2022. Axo-Corbes
Erabaki
Konponketa
Dibuix 2. Opció D
Interpreteu el sòlid representat en planta, alçat i perfil, i, situant el punt p-p′-p″ a la posició P del paper, dibuixeu-ne l’axonometria amb la terna proposada (militar sense reducció) a escala doble (mesurant en les direccions dels eixos axonomètrics). Concreteu el sòlid únicament amb les línies vistes.
[6 punts en total]:
- 1 punt per cadascun dels quatre volums cilíndrics
- 1 punt pel volum ortogonal esquerre
- 1 punt pel volum ortogonal frontal
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)
Dibuix 2. Opció D
Interpreteu el sòlid representat en planta, alçat i perfil, i, situant el punt p-p′-p″ a la posició P del paper, dibuixeu-ne l’axonometria amb la terna proposada (militar sense reducció) a escala doble (mesurant en les direccions dels eixos axonomètrics). Concreteu el sòlid únicament amb les línies vistes.
[6 punts en total]:
- 1 punt per cadascun dels quatre volums cilíndrics
- 1 punt pel volum ortogonal esquerre
- 1 punt pel volum ortogonal frontal
p
0/139