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

Question

Want to see the full answer?

Answer 1

Question

Chapter 7, Problem 7.39QP

Interpretation Introduction

Interpretation:

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

Expert Solution & Answer

Want to see the full answer?

Check out a sample textbook solution

See solution

Students have asked these similar questions

An expression for the root mean square velocity, vrms, of a gas was derived. Using Maxwell’s velocity distribution, one can also calculate the mean velocity and the most probable velocity (mp) of a collection of molecules. The equations used for these two quantities are vmean=(8RT/πM)1/2 and vmp=(2RT/M)1/2 These values have a fixed relationship to each other.(a) Arrange these three quantities in order of increasing magnitude.(b) Show that the relative magnitudes are independent of the molar mass of the gas.(c) Use the smallest velocity as a reference for establishing the order of magnitude and determine the relationship between the larger and smaller values.

The reaction of solid dimethylhydrazine, (CH3)2N2H2, and liquefied dinitrogen tetroxide, N2O4, has been investigated for use as rocket fuel. The reaction produces the gases carbon dioxide (CO2), nitrogen (N2), and water vapor (H2O), which are ejected in the exhaust gases. In a controlled experiment, solid dimethylhydrazine was reacted with excess dinitrogen tetroxide, and the gases were collected in a closed balloon until a pressure of 2.50 atm and a temperature of 400.0 K were reached.(a) What are the partial pressures of CO2, N2, and H2O?(b) When the CO2 is removed by chemical reaction, what are the partial pressures of the remaining gases?

One liter of chlorine gas at 1 atm and 298 K reacts completely with 1.00 L of nitrogen gas and 2.00 L of oxygen gas at the same temperature and pressure. A single gaseous product is formed, which fills a 2.00 L flask at 1.00 atm and 298 K. Use this information to determine the following characteristics of the product:(a) its empirical formula;(b) its molecular formula;(c) the most favorable Lewis formula based on formal charge arguments (the central atom is N);(d) the shape of the molecule.