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Published byLanny Dharmawijaya Modified over 6 years ago
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QM1 Concept Test 9.1 Consider the following statements for the product space of two spin systems: 𝐻 =𝐶 𝑆 1 ∙ 𝑆 2 cannot be written as a diagonal matrix in the uncoupled representation because 𝐻 =𝐶 𝑆 1 ∙ 𝑆 2 does not commute with the operators 𝑆 1𝑧 and 𝑆 2𝑧 whose eigenstates are the basis vectors in the uncoupled representation. 𝐻 =𝐶 𝑆 1 ∙ 𝑆 2 is the Hamiltonian operator which can never be diagonal no matter what basis you choose. We are dealing with two spin-1/2 system. 𝐻 =𝐶 𝑆 1 ∙ 𝑆 2 would be diagonal if we had two spin-one system. (I) only b) (II) only c) (III) only d) (I) and (III) only e) none of the above
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QM1 Concept Test 9.2 Choose all of the following statements that are correct about 𝐻 =𝐶 𝑆 1 ∙ 𝑆 2 for the product space of two spin system. 𝐻 =𝐶 𝑆 1 ∙ 𝑆 2 is an off-diagonal matrix if the basis vectors are the simultaneous eigenstates of 𝑆 1 2 , 𝑆 1𝑧 , 𝑆 2 2 , and 𝑆 2𝑧 . It is possible to put 𝐻 =𝐶 𝑆 1 ∙ 𝑆 2 into a diagonal matrix form in a suitable basis but the basis vectors will not be the eigenstates of 𝑆 1 2 , 𝑆 1𝑧 , 𝑆 2 2 , and 𝑆 2𝑧 . The basis vectors can be chosen to be simultaneous eigenstates of 𝑆 1𝑥 and 𝑆 1𝑧 . (I) only b) (II) only c) (I) and (II) only d) (I) and (III) only e) All of the above.
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QM1 Concept test 9.3 Consider the product space of two spin-1/2 systems. The raising and lowering operators for each spin, e.g., for the first spin are given as 𝑆 1+ = 𝑆 1𝑥 +𝑖 𝑆 1𝑦 and 𝑆 1− = 𝑆 1𝑥 −𝑖 𝑆 1𝑦 . Choose all of the following expressions that are correct for 𝑆 1 ∙ 𝑆 These expressions will be helpful in writing 𝐻 =𝐶 𝑆 1 ∙ 𝑆 2 in the uncoupled or coupled representation. 𝑆 1 ∙ 𝑆 2 = 𝑆 1𝑥 𝑆 2𝑥 + 𝑆 1𝑦 𝑆 2𝑦 + 𝑆 1𝑧 𝑆 2𝑧 𝑆 1 ∙ 𝑆 2 = 𝑆 1− 𝑆 𝑆 𝑆 2− 𝑆 1𝑧 𝑆 2𝑧 𝑆 1 ∙ 𝑆 2 = 𝑆 2 − 𝑆 1 2 − 𝑆 (I) only b) (I) and (II) only c) (I) and (III) only d) (II) and (III) only e) All of the above
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QM1 Concept test 9.4 Consider the product space of two spin-1/2 systems. The raising and lowering operators for each spin, e.g., for the first spin are given as 𝑆 1+ = 𝑆 1𝑥 +𝑖 𝑆 1𝑦 and 𝑆 1− = 𝑆 1𝑥 −𝑖 𝑆 1𝑦 . Choose all of the following expressions for 𝑆 1 ∙ 𝑆 2 that will make 𝐻 =𝐶 𝑆 1 ∙ 𝑆 2 diagonal in the uncoupled representation. 𝑆 1 ∙ 𝑆 2 = 𝑆 1𝑥 𝑆 2𝑥 + 𝑆 1𝑦 𝑆 2𝑦 + 𝑆 1𝑧 𝑆 2𝑧 𝑆 1 ∙ 𝑆 2 = 𝑆 1− 𝑆 𝑆 𝑆 2− 𝑆 1𝑧 𝑆 2𝑧 𝑆 1 ∙ 𝑆 2 = 𝑆 2 − 𝑆 1 2 − 𝑆 (I) only b) (II) only c) (III) only d) Both (I) and (II) e) None of the above
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QM1 Concept test 9.5 Consider the product space of two spin-1/2 systems. The raising and lowering operators for each spin, e.g., for the first spin are given as 𝑆 1+ = 𝑆 1𝑥 +𝑖 𝑆 1𝑦 and 𝑆 1− = 𝑆 1𝑥 −𝑖 𝑆 1𝑦 . Choose all of the following expressions for 𝑆 1 ∙ 𝑆 2 that will make 𝐻 =𝐶 𝑆 1 ∙ 𝑆 2 diagonal in the coupled representation. 𝑆 1 ∙ 𝑆 2 = 𝑆 1𝑥 𝑆 2𝑥 + 𝑆 1𝑦 𝑆 2𝑦 + 𝑆 1𝑧 𝑆 2𝑧 𝑆 1 ∙ 𝑆 2 = 𝑆 1− 𝑆 𝑆 𝑆 2− 𝑆 1𝑧 𝑆 2𝑧 𝑆 1 ∙ 𝑆 2 = 𝑆 2 − 𝑆 1 2 − 𝑆 (I) only b) (II) only c) (III) only d) (I) and (II) only (e) None of the above.
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QM1 Concept test 9.6 Define the raising and lowering operators for a single spin-1/2 system as 𝑆 + = 𝑆 𝑥 +𝑖 𝑆 𝑦 and 𝑆 − = 𝑆 𝑥 −𝑖 𝑆 𝑦 . Which one of the following gives the correct values for 𝑆 𝑥 and 𝑆 𝑦 ? 𝑆 𝑥 = ( 𝑆 𝑆 − )/2, 𝑆 𝑦 = ( 𝑆 + − 𝑆 − )/2i 𝑆 𝑥 = ( 𝑆 + − 𝑆 − )/2, 𝑆 𝑦 = ( 𝑆 + − 𝑆 − )/2i 𝑆 𝑥 = ( 𝑆 𝑆 − )/2, 𝑆 𝑦 = ( 𝑆 𝑆 − )/2i 𝑆 𝑥 = ( 𝑆 + − 𝑆 − )/2, 𝑆 𝑦 = ( 𝑆 𝑆 − )/2i None of the above
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QM1 Concept test 9.7 Consider the product space of two spin-1/2 systems. Which one of the following is correct? 𝑆 1− 𝑆 ↑ ↑ 2 =( 𝑆 1− ↑ 1 )( 𝑆 ↑ 2 )=0 𝑆 1− 𝑆 ↑ ↑ 2 =( 𝑆 1− ↑ 1 )( 𝑆 ↑ 2 )= ℏ 2 ↑ ↑ 2 𝑆 1− 𝑆 ↑ ↑ 2 =( 𝑆 1− ↑ 1 )( 𝑆 ↑ 2 )= 2ℏ 2 ↑ ↑ 2 𝑆 1− 𝑆 ↑ ↑ 2 =( 𝑆 1− ↑ 1 )( 𝑆 ↑ 2 )= ℏ 2 ↓ ↑ 2 None of the above
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QM1 Concept test 9.8 Consider the product space of two spin-1/2 systems. Which one of the following is correct? 𝑆 1− 𝑆 ↓ ↓ 2 =( 𝑆 1− ↓ 1 )( 𝑆 ↓ 2 )=0 𝑆 1− 𝑆 ↓ ↓ 2 =( 𝑆 1− ↓ 1 )( 𝑆 ↓ 2 )= ℏ 2 ↓ ↓ 2 𝑆 1− 𝑆 ↓ ↓ 2 =( 𝑆 1− ↓ 1 )( 𝑆 ↓ 2 )= ℏ 2 ↓ ↑ 2 𝑆 1− 𝑆 ↑ ↑ 2 =( 𝑆 1− ↑ 1 )( 𝑆 ↑ 2 )= 2ℏ 2 ↓ ↓ 2 None of the above
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QM1 Concept test 9.9 Consider the product space of two spin-1/2 systems. Which one of the following is correct? 𝑆 1− 𝑆 ↑ ↓ 2 =( 𝑆 1− ↑ 1 )( 𝑆 ↓ 2 )=0 𝑆 1− 𝑆 ↑ ↓ 2 =( 𝑆 1− ↑ 1 )( 𝑆 ↓ 2 )= ℏ 2 ↓ ↑ 2 𝑆 1− 𝑆 ↑ ↓ 2 =( 𝑆 1− ↑ 1 )( 𝑆 ↓ 2 )= 2ℏ 2 ↓ ↑ 2 𝑆 1− 𝑆 ↑ ↓ 2 =( 𝑆 1− ↑ 1 )( 𝑆 ↓ 2 )= 2ℏ 2 ↑ ↓ 2 None of the above
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QM1 Concept test 9.10 Consider the product space of two spin-1/2 systems. Which one of the following scalar products is correct? ↓ ↑ 𝑆 1− 𝑆 ↑ ↓ 2 = ( ↓ 𝑆 1− ↑ 1 )( ↑ 𝑆 ↓ 2 )=0 ↓ ↑ 𝑆 1− 𝑆 ↑ ↓ 2 = ( ↓ 𝑆 1− ↑ 1 )( ↑ 𝑆 ↓ 2 )= ℏ 2 ↓ ↑ 2 ↓ ↑ 𝑆 1− 𝑆 ↑ ↓ 2 = ( ↓ 𝑆 1− ↑ 1 )( ↑ 𝑆 ↓ 2 )= ℏ 2 ↓ ↑ 𝑆 1− 𝑆 ↑ ↓ 2 = ( ↓ 𝑆 1− ↑ 1 )( ↑ 𝑆 ↓ 2 )= 2ℏ 2 None of the above.
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QM1 Concept Test 9.11 Consider the product space of two spin-1/2 systems. Which one of the following scalar products is correct? ↑ ↓ 𝑆 1− 𝑆 ↑ ↓ 2 =0 ↑ ↓ 𝑆 1− 𝑆 ↑ ↓ 2 = ℏ 2 ↑ ↓ 𝑆 1− 𝑆 ↑ ↓ 2 = ℏ 2 ↑ ↓ 2 ↑ ↓ 𝑆 1− 𝑆 ↑ ↓ 2 = 2ℏ 2 None of the above.
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