Draw diagram to illustrate the symmetric stretching, asymmetric stretching and bending vibration of XeF2
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For BrF5,
[3n1-5] + [3n2-6]
3n-5 is the formula for number of modes of vibration in linear molecule
3n-6 is the formula for number of modes of vibration in non-linear
combined both because the given molecule is complex(BrF5)
where n= no. of electrons
where n1= no of electrons in linear (i.e., F & Lonepair in axial)
where n2= no of electrons in non-linear {4 F's in sq.plane}
F has 6e's
=> 3(2+6)-5 + 3(4*6)-6 = 3(8)+3(24)-11 = 24+72-11= 85
Modes of Vibration in BrF5= 85
Similarly,
XeF2{also a complex} trigonal bipyramidal shape
lone pairs occupying a triangular plane
F's in axial because they're more EN than Lone Pair
=> 3(2*6)-5 + 3(3*2)-6 = 3(12)+3(6)-11= 36+18-11= 63
Modes of Vibration in XeF2=63
[3n1-5] + [3n2-6]
3n-5 is the formula for number of modes of vibration in linear molecule
3n-6 is the formula for number of modes of vibration in non-linear
combined both because the given molecule is complex(BrF5)
where n= no. of electrons
where n1= no of electrons in linear (i.e., F & Lonepair in axial)
where n2= no of electrons in non-linear {4 F's in sq.plane}
F has 6e's
=> 3(2+6)-5 + 3(4*6)-6 = 3(8)+3(24)-11 = 24+72-11= 85
Modes of Vibration in BrF5= 85
Similarly,
XeF2{also a complex} trigonal bipyramidal shape
lone pairs occupying a triangular plane
F's in axial because they're more EN than Lone Pair
=> 3(2*6)-5 + 3(3*2)-6 = 3(12)+3(6)-11= 36+18-11= 63
Modes of Vibration in XeF2=63
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