uitkomst:$v=14 \mathrm{~m} \mathrm{~s}^{-1}
voorbeeld van een berekening:
Als de wrijving wordt verwaarloosd, geldt dat de afname van de zwaarte-energie gelijk is aan de toename van de bewegingsenergie. Er geldt dus:$\frac{1}{2} m v^{2}=m g \Delta hzodatv=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\text{m s}^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\text{m s}\,^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\text{m s}\,s^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\,s^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\,s^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\,s^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\,s^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\,s^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\,s^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\,s^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\,s^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\,s^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\,s^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\,s^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\,s^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~\,s^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~m\,s^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~ms^{-1}v=\sqrt{2 \cdot9{,}81 \cdot(12{,}0-2{,}5)}=14~ms^{-1}$v=\sqrt{2 \cdot 9{,}81 \cdot(12{,}0-2{,}5)}=14 \mathrm{~ms}^{-1}.
➤ Indien correct 1 punt:
➤ Indien correct 1 punt:
