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Chapter 39: Problem 47

A scientist has devised a new method of isolating individual particles. He claims that this method enables him to detect simultaneously the position of a particle along an axis with a standard deviation of 0.12 nm and its momentum component along this axis with a standard deviation of 3.0 \(\times\) 10\(^{-25}\) kg \(\bullet\) m/s. Use the Heisenberg uncertainty principle to evaluate the validity of this claim.

Short Answer

Expert verified
The claim violates the Heisenberg Uncertainty Principle.

Step by step solution

01

Understanding the Heisenberg Uncertainty Principle

The Heisenberg Uncertainty Principle states that it is impossible to simultaneously know the exact position and momentum of a particle. Mathematically, it is expressed as \( \Delta x \cdot \Delta p \geq \frac{\hbar}{2} \), where \( \Delta x \) is the standard deviation of position, \( \Delta p \) is the standard deviation of momentum, and \( \hbar \) is the reduced Planck's constant (\( \hbar \approx 1.0545718 \times 10^{-34} \) Js).
02

Substitute Given Values

In the problem, \( \Delta x = 0.12 \) nm = \( 0.12 \times 10^{-9} \) m and \( \Delta p = 3.0 \times 10^{-25} \) kg \( \cdot \) m/s. Substitute these values into the inequality formula: \( \Delta x \cdot \Delta p \geq \frac{\hbar}{2} \).
03

Calculate Left Side of Inequality

Multiply \( \Delta x \) and \( \Delta p \) to find the left side of the inequality: \( 0.12 \times 10^{-9} \times 3.0 \times 10^{-25} = 3.6 \times 10^{-35} \).
04

Calculate Right Side of Inequality

Calculate the right side of the inequality using \( \frac{\hbar}{2} = \frac{1.0545718 \times 10^{-34}}{2} \approx 5.272859 \times 10^{-35} \).
05

Compare Both Sides of Inequality

Compare the results: \( 3.6 \times 10^{-35} < 5.272859 \times 10^{-35} \). The left side is smaller than the right side, which indicates that the uncertainty product is less than \( \frac{\hbar}{2} \), violating the Heisenberg Uncertainty Principle.

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Quantum Mechanics
Quantum mechanics is a fundamental theory in physics that describes the behavior of particles at the smallest scales, such as atoms and subatomic particles. Unlike classical physics, which works well for larger objects, quantum mechanics takes into account the wave-like nature of particles. This means that particles do not have definite positions or velocities until they are measured. Instead, their properties are described by probabilities. A key feature of quantum mechanics is the concept of wave-particle duality. This idea suggests that every particle exhibits both particle-like and wave-like behavior. For example:
  • Photons can exhibit wave behavior, such as interference, but also particle behavior when they hit a detector one by one.
  • Electrons can form interference patterns when passed through a double-slit apparatus, highlighting their wave nature.
This fundamentally changes how we think about particles and forces us to reconsider traditional notions of measurement and observation.
Standard Deviation
Standard deviation is a statistical measure that quantifies the amount of variation or dispersion of a set of values. In simple terms, it tells us how spread out the values are from the mean (average). In the context of quantum mechanics, it is used to express the uncertainty in the position or momentum of a particle. In the Heisenberg Uncertainty Principle, standard deviation plays a crucial role as it defines the range within which the values are likely to be found. For example:
  • If the standard deviation of a particle's position is small, it means the position is known quite accurately.
  • If the standard deviation is large, the position is more uncertain.
Understanding this concept is vital, as the product of the standard deviations of position and momentum must always respect the inequality prescribed by the Heisenberg Uncertainty Principle.
Particle Physics
Particle physics is a branch of physics that investigates the fundamental constituents of matter and the forces through which they interact. In this field, researchers study particles such as electrons, protons, quarks, and neutrinos. Understanding these particles is crucial for explaining how matter is constructed and interacts. In particle physics, experiments are often conducted using particle accelerators, which collide particles at very high speeds. These collisions help reveal the properties of particles and allow scientists to observe behaviors that are not evident in everyday experiences.
  • The Standard Model is a theory that describes the electromagnetic, weak, and strong nuclear interactions among these particles.
  • Experiments in particle physics have led to the discovery of numerous particles, including the Higgs boson, which gives other particles their mass.
Particle physics continues to search for answers to unresolved questions, such as the nature of dark matter and energy, further unraveling the mysteries of the universe.

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Most popular questions from this chapter

(a) What is the smallest amount of energy in electron volts that must be given to a hydrogen atom initially in its ground level so that it can emit the H\(_\alpha\) line in the Balmer series? (b) How many different possibilities of spectral-line emissions are there for this atom when the electron starts in the \(n\) = 3 level and eventually ends up in the ground level? Calculate the wavelength of the emitted photon in each case.

Light from an ideal spherical blackbody 15.0 cm in diameter is analyzed by using a diffraction grating that has 3850 lines/cm. When you shine this light through the grating, you observe that the peak-intensity wavelength forms a first-order bright fringe at \(\pm\)14.4\(^\circ\) from the central bright fringe. (a) What is the temperature of the blackbody? (b) How long will it take this sphere to radiate 12.0 MJ of energy at constant temperature?

A CD-ROM is used instead of a crystal in an electrondiffraction experiment. The surface of the CD-ROM has tracks of tiny pits with a uniform spacing of 1.60 \(\mu{m}\). (a) If the speed of the electrons is 1.26 \(\times\) 10\(^4\) m/s, at which values of \(\theta\) will the \(m\) = 1 and \(m\) = 2 intensity maxima appear? (b) The scattered electrons in these maxima strike at normal incidence a piece of photographic film that is 50.0 cm from the CD-ROM. What is the spacing on the film between these maxima?

An atom with mass \(m\) emits a photon of wavelength \(\lambda\). (a) What is the recoil speed of the atom? (b) What is the kinetic energy \(K\) of the recoiling atom? (c) Find the ratio \(K/E\), where \(E\) is the energy of the emitted photon. If this ratio is much less than unity, the recoil of the atom can be neglected in the emission process. Is the recoil of the atom more important for small or large atomic masses? For long or short wavelengths? (d) Calculate \(K\) (in electron volts) and \(K/E\) for a hydrogen atom (mass 1.67 \(\times\) 10\(^{-27}\)kg) that emits an ultraviolet photon of energy 10.2 eV. Is recoil an important consideration in this emission process?

A certain atom has an energy level 2.58 eV above the ground level. Once excited to this level, the atom remains in this level for 1.64 \(\times\) 10\(^{-7}\) s (on average) before emitting a photon and returning to the ground level. (a) What is the energy of the photon (in electron volts)? What is its wavelength (in nanometers)? (b) What is the smallest possible uncertainty in energy of the photon? Give your answer in electron volts. (c) Show that \(\mid \Delta{E}/E \mid = \mid \Delta \lambda/\lambda \mid if \mid \Delta \lambda/\lambda \mid \ll\) 1. Use this to calculate the magnitude of the smallest possible uncertainty in the wavelength of the photon. Give your answer in nanometers.
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