Consider a system of total angular momentum j=1 and the operators are given by,Choose the correct options. (Marks: 4)Calculate and , when jx = -h/2πOPTIONS = h2/8π2 and = 0 = 0 and = h2/8π2 = 2 and = h2/π2 = 0 and = h/8π2

The raising (J+) and lowering (J_) operators are defined by J+=JX+ iJy and J_ = JX- iJy.Read the following passage to answer the given questions based on it. Choose the correct options. (Marks: 1)What would be J+J-OPTIONS J2 - Jz2 + hJz J - Jz2 + hJz J2 - J + hJz J2 - Jz2 -hJz

PASSAGEConsider a particle whose wave function is,Read the following passage to answer the given questions based on it. Choose the correct options. (Marks: 1)Find the total angular momentum of this particleOPTIONS √2ħ √6ħ2 √6ħ √2ħ2

Which of the following commutation relations holds for the angular momentum operators in quantum mechanics?OPTIONS [Lx, Ly] = iħ [Lx, Ly] = 0 [Lx, Ly] = -iħLz [Lx, Ly] = iħLz

Which of the following commutation relations holds for the angular momentum operators in quantum mechanics?OPTIONS [Lx, Ly] = iħLz [Lx, Ly] = 0 [Lx, Ly] = -iħLz [Lx, Ly] = iħ

The raising (J+) and lowering (J_) operators are defined by J+=JX+ iJy and J_ = JX- iJy.Read the following passage to answer the given questions based on it. Choose the correct options. (Marks: 1)What would be [Jz, J+]OPTIONS ±hJ+ ±hJ- ±hJ ±hJx