<Dl> <Dd> <Dl> <Dd> <Table> <Tr> <Td> <P> ε _̄ A η _̄ B ≥ ⟨ (A ^, B ^) ⟩ (\ displaystyle (\ bar (\ varepsilon)) _ (A) \, (\ bar (\ eta)) _ (B) \, \ geq \, \ left \ langle ((\ hat (A)), (\ hat (B))) \ rangle \ right) </P> </Td> </Tr> </Table> </Dd> </Dl> </Dd> </Dl> <Dd> <Dl> <Dd> <Table> <Tr> <Td> <P> ε _̄ A η _̄ B ≥ ⟨ (A ^, B ^) ⟩ (\ displaystyle (\ bar (\ varepsilon)) _ (A) \, (\ bar (\ eta)) _ (B) \, \ geq \, \ left \ langle ((\ hat (A)), (\ hat (B))) \ rangle \ right) </P> </Td> </Tr> </Table> </Dd> </Dl> </Dd> <Dl> <Dd> <Table> <Tr> <Td> <P> ε _̄ A η _̄ B ≥ ⟨ (A ^, B ^) ⟩ (\ displaystyle (\ bar (\ varepsilon)) _ (A) \, (\ bar (\ eta)) _ (B) \, \ geq \, \ left \ langle ((\ hat (A)), (\ hat (B))) \ rangle \ right) </P> </Td> </Tr> </Table> </Dd> </Dl> <Dd> <Table> <Tr> <Td> <P> ε _̄ A η _̄ B ≥ ⟨ (A ^, B ^) ⟩ (\ displaystyle (\ bar (\ varepsilon)) _ (A) \, (\ bar (\ eta)) _ (B) \, \ geq \, \ left \ langle ((\ hat (A)), (\ hat (B))) \ rangle \ right) </P> </Td> </Tr> </Table> </Dd>

Which of the following states of being can be measured with a high degree of certainty