The wavelength (in nanometers) associated with a beam of neutrons moving at 7 .00 × 10 2 m/s in which mass of a neutron is 1 .675 × 10 − 27 kg should be calculated using the concept of De Broglie’s hypothesis. Concept Introduction: De Broglie’s hypothesis explains the behaviour of waves. Waves behave like particles whereas particles can behave like wave. De Broglie derived the equation in which the particle and wave properties are related: λ = h mu Where, λ - the wavelength associated with a moving particle; h - Planck’s constant; m - the mass of the particle and u - the velocity of the moving particle. To find: Calculate the wavelength (in nanometers) associated with a beam of neutrons moving at 7 .00 × 10 2 m/s in which mass of a neutron is 1 .675 × 10 − 27 kg
The wavelength (in nanometers) associated with a beam of neutrons moving at 7 .00 × 10 2 m/s in which mass of a neutron is 1 .675 × 10 − 27 kg should be calculated using the concept of De Broglie’s hypothesis. Concept Introduction: De Broglie’s hypothesis explains the behaviour of waves. Waves behave like particles whereas particles can behave like wave. De Broglie derived the equation in which the particle and wave properties are related: λ = h mu Where, λ - the wavelength associated with a moving particle; h - Planck’s constant; m - the mass of the particle and u - the velocity of the moving particle. To find: Calculate the wavelength (in nanometers) associated with a beam of neutrons moving at 7 .00 × 10 2 m/s in which mass of a neutron is 1 .675 × 10 − 27 kg
Solution Summary: The author explains De Broglie's hypothesis, which describes the behaviour of waves, by calculating the wavelength and velocity of a beam of neutrons.
The wavelength (in nanometers) associated with a beam of neutrons moving at 7.00 × 102 m/s in which mass of a neutron is 1.675 × 10−27 kg should be calculated using the concept of De Broglie’s hypothesis.
Concept Introduction:
De Broglie’s hypothesis explains the behaviour of waves. Waves behave like particles whereas particles can behave like wave. De Broglie derived the equation in which the particle and wave properties are related:
λ =hmu
Where, λ - the wavelength associated with a moving particle; h - Planck’s constant; m - the mass of the particle and u - the velocity of the moving particle.
To find: Calculate the wavelength (in nanometers) associated with a beam of neutrons moving at 7.00 × 102 m/s in which mass of a neutron is 1.675 × 10−27 kg
CUE COLUMN
NOTES
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What does the phrase 'fit for purpose' mean in relation to analytical chemistry? Please provide examples too.
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