Calculateur de Longueur d'Onde de De Broglie Gratuit

Calculez la longueur d'onde quantique associée à une particule en mouvement. Appliquez la relation lambda = h/p de De Broglie.

kg
m/s

De Broglie Wavelength

0.000000000727412 m

Wavelength (nm)0.727412 nm
Wavelength (pm)727.4124 pm
Voir la formule

Formule

De Broglie Wavelength

Louis de Broglie proposed that all matter has wave-like properties, with a wavelength inversely proportional to momentum.

Formula

lambda = h / p = h / (m v)

  • *h* = 6.626 x 10^-34 J s (Planck constant)
  • *m* = particle mass
  • *v* = particle velocity

    • This wavelength is measurable for electrons and neutrons, and is the basis of electron microscopy.

    Exemple Résolu

    Electron (m = 9.109e-31 kg) at v = 1e6 m/s.

    1. 01lambda = h / (m v)
    2. 02p = 9.109e-31 * 1e6 = 9.109e-25 kg m/s
    3. 03lambda = 6.626e-34 / 9.109e-25
    4. 04lambda = 7.274e-10 m = 0.727 nm

    Questions Fréquentes

    Can macroscopic objects have a de Broglie wavelength?

    Technically yes, but it is negligibly small. A 1 kg ball at 1 m/s has a wavelength of about 6.6 x 10^-34 m, far too tiny to ever detect.

    How is the de Broglie wavelength measured?

    By diffraction experiments. Electrons scattered off crystal lattices produce interference patterns consistent with their predicted wavelength.

    Why is this important for electron microscopes?

    Electron wavelengths at high energies are much shorter than visible light, allowing electron microscopes to resolve atomic-scale features.

    Apprendre

    Understanding Newton's Laws of Motion

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