The uncertainity in the position of a moving bullet of mass 10 g is `10^(-5)` m.Calculate the uncertainty in its velocity .

The uncertainity in the momentum of an electron is 10^(-5) kgms^(-1) .Calculate the uncertainity of its position. [h = 6. 62 xx 10^(-34) JS] .

If the uncertainty of position of a particle of mass 1xx10^-4 gm be 1.56xx 16^-3 cm then find the uncertainty of its velocity?

Calculate the uncertainty in velocity of a moving object of mass 25 g, if the uncertainty in- its position be 10^-5.

Calculate the uncertainty ini velocity (m*s^(-1)) of a moving object of mass 25g, if the uncertainty in its position be 10^(-5)m . [h=6.6xx10^(-34)J*s]

A proton is accelerated to a velocity of one tenth times that of the velocity of light. If the uncertainty in the determination of its velocity be +-0.5% , calculate the uncertainty in locating its position. [mass of proton =1.675xx10^(-27)kg ].

I fthe uncertainty in position of a moving electron is equal to its de Broglie wavelength, prove that its velocity is completely uncertain.

The uncertainty in the determination of velocity of a dust particle (of mass 0.1 mg) is 4.5xx10^(-20)m*s^(-1) . Calculate the least uncertainty in its position.

Calculate the uncertainty in the position of an electron if the uncertainty in its velocity is 5.7 xx 10^5 m//sec (h = 6.626 xx 10^(-34) kg m^2 s^(-1) , mass of the electron = 9.1 xx 10^(−31) kg ).

The approximate mass of an electron is 10^(-27) g. Calculate the uncertainty in its velocity if the uncertainty in its position were of the order of 10^(-11) m

The uncertainty in the position of an electron moving with a velocity of 1x10^4ms^-1 (accurate up to 0.011% ) will be