if ∆x is the uncertainty in the measurement of the position of a particle along the x-axis and ∆Px is the uncertainty in the measurement of the linear momen...

if ∆x is the uncertainty in the measurement of the position of a particle along the x-axis and ∆Px is the uncertainty in the measurement of the linear momentum along the x-axis, then the uncertainty principle relation is given as

Answer Details

The uncertainty principle is a fundamental principle of quantum mechanics that states that it is impossible to simultaneously determine the exact position and momentum of a particle. The uncertainty principle relation is given by the equation: ∆x ∆P ≥ h, where ∆x is the uncertainty in the measurement of the position of a particle along the x-axis, and ∆P is the uncertainty in the measurement of the linear momentum along the x-axis. The symbol h represents Planck's constant, which is a fundamental constant of nature. Therefore, the option that represents the uncertainty principle relation correctly is: ∆x ∆P ≥ h.