A dust particle has mass equal to `10^(-11)g`, diameter `10^(-4)cm` and velocity `10^(-4)cms^(-1)`. The error in measurment of velocity is `0.1%`. What will be the uncertainty in its position?

A dust particle has mass equal to 10^(11)g dimeter equal to 10^(-4) cm and velocity equal to 10^(-4) cms^(-1) The error is the measurment of velocity is 0.1% .Calculate the uncertiainty in its position comment on the result

A boll of mass 200 g is moving with a velocity of 10 m sec^(-1) . If the error in measurement of velocity is 0. 1% , the uncertainty in its position is :

The uncertainty in position for a dust particle (m=10^(-11)g : diameter =10^(-4)cm and velocity = 10^(-4)(cm)/s will be (The error in measurement of velocity is 1% ) X times10^(-10) cm then "X" is

The mass of a particle is 10^(-10)g and its radius is 2xx10^(-4)cm . If its velocity is 10^(-6)cm sec^(-1) with 0.0001% uncertainty in measurement, the uncertainty in its position is :

It is not possible to determine preciselt both the position and momentum (or velocity) of a small moving particle such as electron, proton etc. This is known as Heisenber uncertainty principle. The mathemactical form of this principle is : Delta x.Delta p ge (h)/(4pi) (constant) However this principle is irrevalent in case of bigger particles such as a cup, ball, car etc., that we come across in our daily life. Given that the mass of electron is 9.1 xx 10^(-31) kg and velocity of electron is 2.2 xx 10^(6) ms^(-1) , if uncertainty in its velocity is 0.1% , the uncertainty in position would be

The uncertainty in the velocity of moving bullet of mass 10 g, when uncertainty in its position is 10^(-5) m is

A ball has a mass of "10g" and speed of "20m/s" . If the speed can be measured with the accuracy of 1%, then the uncertainty in its position is

An e^- moving with a velocity of 2xx10^6m//s . If the speed can be measured with an accuracy of 0.02%. Calculaate the uncertainty in its position is 1.45xx10^(-x) . The value of x: