calculate the slope and uncertainty in the slope.
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calculate the slope and uncertainty in the slope.
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- Calculate the minimum uncertainty in the speed of a ball of mass 550 g that is known to be within 1.4 um of a certain location on a bat.Use Heisenberg equation to calculate the uncertainty in the position of a proton moving at a speed of 3.00×104 m s-1 within an error of 50 m s-1. Note: the mass of a proton is mp = 1.6726×10-27 kg.Needs Complete solution with 100 % accuracy. Don't use chat gpt or ai i definitely upvote you.
- In an experiment to understand the concepts of potential and kinetic energies, as shown below, suppose, you are making some errors while making the measurement. iainigh If the weight used in the experiment is having an uncertainty of 1.9+ 0.01 N, the initial height is measured, with an uncertainty of 40 = 0.06 cm and the final height with an uncertainty of 28.2 + 0.06 cm. (Potential energies are calculated by the formula weight x height) Calculate, 1) The absolute uncertainty in the calculated value of Initial Potential Energy (in Joules) = 2) The absolute uncertainty in the calculated value of Final Potential Energy (in Joules) = 3) The absolute uncertainty in the calculated value of Loss of Potential Energies (in Joules) =Speed and uncertainty in position- I particle of mass 3.0 x 10 ^-9 kg moves with speed 4.0m/sec if its speed is uncertain by 0.4% what is the minimum uncertainty in its position to three significant figures and in units of metres?2: Find the variance of defining the position of a free particle using the uncertainty principle?
- What is the meaning of a first order approximation?The velocity of a neutron is measured to be 6.0 x 106 m s-1 with an uncertainty of 1.0 × 103 m s-1. (i) What is the minimum uncertainty of the simultaneous measurement of the position of the neutron? (ii) State how the minimum uncertainties of a measured energy and a measured time are relatedThe speed of a proton is measured to within an uncertainty of 1 × 103m/s. Calculate the length of the smallest region of space in which the electron can be confined.