Which of the following represents the time-independent solution of Schrodinger's equation for a particle such that its total energy is less than its energy potential? Assume V (x) = Vo, constant and each integration constant equal to a parameter A 1:) v (x) = 2A cosh (x/a). where: a = (Vo – E) 2:) v (x) = 2A sinh (rVa), where: a = # (Vo – E) 3:) (x) = 2A cosh (x/a) ,where : a x = # (E – Vo) 4:) (x) = 2A cos (xa), where: a = # (Vo – E) 5:) v (x) = 2A sin (ax),where : a = (Vo – E)
Which of the following represents the time-independent solution of Schrodinger's equation for a particle such that its total energy is less than its energy potential? Assume V (x) = Vo, constant and each integration constant equal to a parameter A 1:) v (x) = 2A cosh (x/a). where: a = (Vo – E) 2:) v (x) = 2A sinh (rVa), where: a = # (Vo – E) 3:) (x) = 2A cosh (x/a) ,where : a x = # (E – Vo) 4:) (x) = 2A cos (xa), where: a = # (Vo – E) 5:) v (x) = 2A sin (ax),where : a = (Vo – E)
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Which of the following represents the time-independent solution of Schrodinger's equation for a particle such that its total energy is less than its energy potential? Assume V (x) = Vo, constant and each integration constant equal to a parameter A
Transcribed Image Text:Which of the following represents the time-independent solution of Schrodinger's equation
for a particle such that its total energy is less than its energy potential? Assume V (x) = Vo,
constant and each integration constant equal to a parameter A
1:) v (x) = 2A cosh (ra). where: a
(Vo – E)
2:) (x) = 2A sinh (rva), where: a =
翌(%- E)
3:) (x) = 2A cosh (x/a),where : a = (E – Vo)
4:) (x) = 2A cos (rVa), where: a = (Vo – E)
5:) (x) = 2A sin (ar),where : a = (Vo – E)
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