Egin ditugun ariketak:
Bete hurrengo taula:
![](data:image/png;base64,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)
Idatzi idazkera zientifikoan hurrengo magnitudeak: a) Lurratik Andromeda galaxiara dagoen distantzia: 7600000000000000000 km.
b) Eguzkiaren masa: 1987000000000000000000000000000 kg.
c) Elektroiaren masa: 0,00000000000000000000000000091085 g.
d) Protoiaren eradioa: 0,00000000005 m.
Giza ilearen hazkunde-abiadura $\displaystyle 1'6 \cdot 10^{-8}$ km/h-koa da. Zenbat zentimetro haziko da ilea hilabetean? Eta urtebetean?