Answer:
Momentum
Explanation:
Heisenberg uncertainty principle says it is uncertain to find the momentum and position of a particle at the same time. there must be some uncertainty.
[tex]\Delta X.\Delta P\geq \hbar[/tex].
It means decreasing the position value will increase the momentum value while decreasing the momentum value will increase the position value.
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According to the Heisenberg Uncertainty Principle, it is impossible to know precisely both the position and the momentum of an electron or subatomic particle.
Heisenberg uncertainty principle:
It says that it is impossible to find the momentum and position of a particle at the same time. There always must be some uncertainty.
Formula
[tex]\bold {\Delta x \Delta p \geq \frac{h}{4 \pi}}[/tex]
[tex]\bold {\Delta x}[/tex] = uncertainty in position
[tex]\bold {\Delta p}[/tex] = uncertainty of momentum
h = Planck's constant
It means if position value is decreased, momentum value will increase while if momentum value is deceased, the position value will increase.
Therefore, according to the Heisenberg Uncertainty Principle, it is impossible to know precisely both the position and the momentum of an electron or subatomic particle.
To more about the Heisenberg Uncertainty Principle,
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