On the basis of heisenhergs uncertainty ...

On the basis of heisenhergs uncertainty principle show that the electron can not exist within the nucleus

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To show that an electron cannot exist within the nucleus based on Heisenberg's Uncertainty Principle, we will follow these steps: ### Step 1: Understand the Heisenberg Uncertainty Principle The Heisenberg Uncertainty Principle states that it is impossible to know both the position (Δx) and momentum (Δp) of a particle with absolute certainty. The principle can be mathematically expressed as: \[ \Delta x \cdot \Delta p \geq \frac{h}{4\pi} \] where \( h \) is Planck's constant. ...

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The Heisenberg uncertainty principle can be applied to:

Mathematically, Heisenberg's uncertainty principle can best be explained by

It is not possible to determine precisely both the position and momentum (or velocity) of a small moving particle such as electron, proton etc. This is known as Heisenberg uncertainty principle. The mathematical form of this principle is : Delta x.Delta p ge (h)/(4pi) (constant) However this principle is irrelevant in case of bigger particles such as a cup, ball, car etc., that we come across in our daily life. If the uncertainty in position of the electron is zero, the uncertainty in its momentum would be

It is not possible to determine precisely both the position and momentum (or velocity) of a small moving particle such as electron, proton etc. This is known as Heisenberg uncertainty principle. The mathematical form of this principle is : Delta x.Delta p ge (h)/(4pi) (constant) However this principle is irrelevant in case of bigger particles such as a cup, ball, car etc., that we come across in our daily life. If uncertainty in position and momentum are equal, the v uncertainty in velocity would be

It is not possible to determine precisely both the position and momentum (or velocity) of a small moving particle such as electron, proton etc. This is known as Heisenberg uncertainty principle. The mathematical form of this principle is : Delta x.Delta p ge (h)/(4pi) (constant) However this principle is irrelevant in case of bigger particles such as a cup, ball, car etc., that we come across in our daily life. In case of small microscopic particles, Heisenberg's uncertainty principle rules out simultaneous exact determination of their

A : Uncertainty principle demands that an electron confined to a nucleus must have very high energy so that the electron cannot reside in a nucleus. R: The electrostatic attraction between electron and proton is large at such a small distance but is not enough to bind such a high -energy electron.

State Heisenberg's uncertainty principle. If the uncertainties in the measurement of position and momentum of an electron are equal calculate the uncertainty in measuring the velocity.

Radioactive nuclei emit beta^-1 particles. Electrons exist inside the nucleus.

Assertion (A) : The position of electron can be determined with the help of an electronic microscope. Reason (R) : The product of uncertainty in momentum and the uncertainty in the position of an electron cannot be less than a finite limit.

CENGAGE CHEMISTRY ENGLISH-ATOMIC STRUCTURE-Concept Applicationexercise(4.3)

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