wave mechanical model of the atom depends upon:
(a)de-Broglie concept of dual nature of electron
(b)Heisenberg uncertainty principle
(c)Schrodinger uncertainty principle
(d)All of these
wave mechanical model of the atom depends upon:
(a)de-Broglie concept of dual nature of electron
(b)Heisenberg uncertainty principle
(c)Schrodinger uncertainty principle
(d)All of these
(a)de-Broglie concept of dual nature of electron
(b)Heisenberg uncertainty principle
(c)Schrodinger uncertainty principle
(d)All of these
A
de-Broglie concept of dual nature of electron
B
Heisenberg uncertainty principle
C
Schrodinger uncertainty princple
D
All of these
Text Solution
AI Generated Solution
The correct Answer is:
To solve the question regarding the wave mechanical model of the atom and its dependencies, we can analyze each option provided:
### Step-by-Step Solution:
1. **Understanding the Wave Mechanical Model**:
- The wave mechanical model of the atom describes electrons not as particles in fixed orbits but as wave functions that give probabilities of finding an electron in a certain region around the nucleus.
2. **Analyzing Option (a): de-Broglie Concept of Dual Nature of Electron**:
- Louis de Broglie proposed that particles, such as electrons, exhibit both wave-like and particle-like properties. This dual nature is fundamental to the wave mechanical model as it allows us to treat electrons as waves, leading to the concept of wave functions.
3. **Analyzing Option (b): Heisenberg Uncertainty Principle**:
- The Heisenberg Uncertainty Principle states that it is impossible to know both the exact position and momentum of an electron simultaneously. This principle is crucial in the wave mechanical model because it emphasizes the probabilistic nature of electron positions and momenta.
4. **Analyzing Option (c): Schrodinger Uncertainty Principle**:
- While there is no specific "Schrodinger uncertainty principle," Erwin Schrödinger developed the wave equation that describes how the quantum state of a physical system changes over time. This wave equation incorporates the principles of wave mechanics and is foundational to the wave mechanical model.
5. **Conclusion**:
- Since all three concepts (de-Broglie's dual nature, Heisenberg's uncertainty principle, and Schrödinger's wave equation) are integral to the wave mechanical model of the atom, the correct answer is:
**(d) All of these**.
### Final Answer:
**(d) All of these**
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