Speed of light c=2.99792108sm Planck's constant h=6.626071034Js Rydberg constant RH=13.6057eV Bohr Radius a0=5.291771011m The radial probability of finding an electron in the 1 s orbital of a hydrogen atom at radius r in a spherical shell with thickness dr is given by: P(r)=r2R10(r)2dr In this expression, the radial function is given by: R10(r)=2(a01)23ea0r Calculate the ratio of probability of finding the electron in a spherical shell at r2=3a0 to the probability of finding the electron in a spherical shell at r1=a0. Both shells have the same thickness dr=1.00105a0. The probability ratio P(r1)P(r2) to three significant figures is: 2 Should the probability ratio be larger or smaller than one, given that a0 is the most probable radius for an electron in the 1s orbital in the hydrogen atom? You have 2 errors to correct: Your answer is outside the acceptable bounds. You may have made a calculation or rounding error. Also, your answer does not have the correct number of significant digits. You have used 4 of 10 attempts