Calculate the probability density | W 100(r,8,$)|² of finding the electron at the nucleus (considered as a point at the center of coordinates) for a hydrogen atom in the state 100. \3/2 Yoo(e,4) = 2Zr (hbar)? a0 = m,e? R10(r) =2 nao Please notice that the above formulas are written in the cgs system of units, so mass is in grams, distance is in cm, and energy is in erg = g cm2/s2. In this system of units e = 4.8032068 X 10-10 statC, where 1 statC = 1 cm3/2 g1/2 s-1 Oa. ´0. 18 pm-3 2.15 x 10-6 pm-3 1.54 x 10-18 pm-3 od. 6.22 x 10-10 pm-3 Oe. 1.23 x 104 pm-3
Calculate the probability density | W 100(r,8,$)|² of finding the electron at the nucleus (considered as a point at the center of coordinates) for a hydrogen atom in the state 100. \3/2 Yoo(e,4) = 2Zr (hbar)? a0 = m,e? R10(r) =2 nao Please notice that the above formulas are written in the cgs system of units, so mass is in grams, distance is in cm, and energy is in erg = g cm2/s2. In this system of units e = 4.8032068 X 10-10 statC, where 1 statC = 1 cm3/2 g1/2 s-1 Oa. ´0. 18 pm-3 2.15 x 10-6 pm-3 1.54 x 10-18 pm-3 od. 6.22 x 10-10 pm-3 Oe. 1.23 x 104 pm-3
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Transcribed Image Text:Calculate the probability density | W100(r,8,0)|² of finding the electron at the nucleus (considered as a point at the center of coordinates) for a hydrogen
atom in the state 100.
\3/2
R10(r) =:
2Zr
(hbar)?
ao =
me?
Yoo(e,$)= -
nao
Please notice that the above formulas are written in the cgs system of units, so mass is in grams, distance is in cm, and energy is in erg = g cm2/s2. In
this system of units e = 4.8032068 X 10-10 statC, where 1 statC = 1 cm3/2 g1/2 s-1
O 0.18 pm-3
2.15 x 10-6 pm-3
Oc.
1.54 x 10-18
Pm-3
6.22 x 10-10 pm-3
Oe1 23 x 104 pm-3
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