Q1: Consider the election in a hydrogen atom to initially be in the state: Y(1= 0) = √ -ROYO + √FR₂X₁ -R32Y₂¹² a) What is the probability of measuring the energy of this state and obtaining E₂? at t=0 but something different at t>0 A. at t=0 but something different at t>0 П C. always √3 B. D. always 3 E. Something else. b) Explain your answer. x

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In the following questions, we will use quantum states made up of the hydrogen energy eigenstates: Q1: Consider the election in a hydrogen atom to initially be in the state: F A. B. C. a) What is the probability of measuring the energy of this state and obtaining E₂? √3 √ vnim (r0,0)=R(r)Y," (0,0) always Y(t = 0) = √3 R₁OYO at t=0 but something different at t>0 ² at t=0 but something different at t>0 D. always 3 + E. Something else. b) Explain your answer. R₂₁ + R32Y₂¹