Deck 29: Atomic Physics

A)principal quantum number n.
B)orbital quantum number $\ell$
C)orbital magnetic quantum number $m _ { t }$ .
D)n, $\ell$ and $m _ { t }$
E)n and $\ell$ only.

A) $\int \left| \Psi _ { 1 s } \right| ^ { 2 } 4 \pi r ^ { 2 } d r$
B) $\int \left| \Psi _ { 1 s } \right| ^ { 2 } d r$
C) $\int \left| \Psi _ { 1 s } \right| ^ { 2 } r d r$
D) $\int \left| \Psi _ { 1 s } \right| ^ { 2 } r ^ { 2 } d r$
E) $\int \left| \Psi _ { 1 s } \right| ^ { 2 } r ^ { 3 } d r$

A) $\ell$ to $\ell$
B)-( $\ell$ + 1)to ( $\ell$ + l)
C)-( $\ell$ + 2)to ( $\ell$ + 2)
D)-( $\ell$ + 3)to ( $\vec { B }$ + 3)
E)0 to n- 1

A)dP/dt
B)dP/dr
C) $\int r P ( r ) 4 \pi r ^ { 2 } d r$
D) $\int r P ( r ) d r$
E)d²P/dr²

A) $\left( \pi / a _ { 0 } ^ { 3 } \right) \int \exp \left( - 2 r / a _ { 0 } \right) 4 \pi r ^ { 2 } d r$ .
B) $\left( \pi / a _ { 0 } ^ { 3 } \right) ^ { 1 / 2 } \int \exp \left( - 2 r / a _ { 0 } \right) 4 \pi r ^ { 2 } d r$
C) $\left( \pi / a _ { 0 } ^ { 3 } \right) ^ { 1 / 2 } \int \exp \left( - 2 r / a _ { 0 } \right) d r$
D) $\left( \pi / a _ { 0 } ^ { 3 } \right) ^ { 1 / 2 } \int \exp \left( - 2 r / a _ { 0 } \right) d r$ .
E) $\frac { d } { d r } \left[ \frac { 2 } { \pi a _ { 0 } ^ { 3 } } \exp \left( - 2 r / a _ { 0 } \right) \right] \left[ \frac { 1 } { \pi a _ { 0 } ^ { 3 } } \right] ^ { 1 / 2 } e ^ { - r / a ^ { 0 } 1 / 2 }$

A) $\overrightarrow { \mathbf { L } }$ can never be perpendicular to $\vec { B }$ .
B) $\overrightarrow { \mathbf { L } }$ can be aligned parallel to $\vec { B }$ .
C) $\overrightarrow { \mathbf { L } }$ must be perpendicular to $\vec { B }$ .
D) $\overrightarrow { \mathbf { L } }$ can never be aligned parallel to $\vec { B }$ .

A)0.30 *10 ^{- 10} m
B)1.7 *10 ^{- 10} m
C)0.50 *10 ^{- 10} m
D)3.5 *10 ^{- 10} m
E)1.5 *10 ^{- 10} m

A)the total angular momentum is a small multiple of $\hbar$ .
B)the total energy is a small multiple of the energy in the lowest quantized state.
C)the difference in energy between adjacent quantized levels becomes vanishingly small.
D)all electron spins are paired so that L = 0.
E)there is a vacancy in an inner level in the atom.

A)m_s
B)n
C) $m _ { t }$
D) $\ell$
E)m_j

A)the ground state angular momentum was L = 1 $\hbar$ .
B)the frequency of the radiation emitted when an electron "jumps" from one allowed orbit to another was hf = E_i - E_f.
C)the potential energy function for the hydrogen atom was given by V(r)= -ke²/r.
D)the energy of the ground state of the hydrogen atom was E_n = -13.6 eV.

A)principal quantum number n.
B)orbital quantum number $\ell$
C)orbital magnetic quantum number $m _ { t }$ .
D)n, $\ell$ and $m _ { t }$
E)n and $\ell$ only.

A)Adam,because the man is always right.
B)Adam because n $\le$$\ell$ - 1.
C)Eve,because n $\le$ $\ell$ - 1.
D)Eve,because $\ell$ $\le$ n -1.
E)Neither,because Adam is wrong and the Snake told a subtle lie.

A)1,2
B)0,1
C)0,1,2
D)0,1,2,3
E)1,2,3

A)3 *10 ^{- 24}
B)2 *10 ^{- 24}
C)1 *10 ^{- 24}
D)4 * 10 ^{- 24}
E)3* 10 ^{- 15}

A)18
B)25
C)50
D)9
E)11

A) $\frac { 1 } { n ^ { 2 } } a _ { 0 }$ .
B) $\frac { a _ { 0 } } { n }$ .
C) $\sqrt { n } a _ { 0 }$ .
D)na₀.
E)n²a₀.

A)-1,0,1
B)2,1,0
C)2,1,0,-1,-2
D)0
E)3,2,1,0,-1,-2,-3

A)n
B) $\ell$
C) $\vec { B }$
D)m_s
E)m_j

A)1 to $\infty$
B)2 to $\infty$
C)3 to $\infty$
D)any real number
E)1 to 10

A)a minimum number of electrons has unpaired spins.
B)a minimum number of electrons has intrinsic angular momentum.
C)a maximum number of electrons has unpaired spins.
D)a maximum number of electrons first fills the next energy level.
E)the maximum number of electrons has the same set of quantum numbers.

A)orbital angular momentum quantization
B)energy quantization
C)space quantization
D)magnetic orbital quantization
E)that particles behave like waves

A)five p
B)three p
C)two s
D)one d
E)one s

A)a photon has linear momentum.
B)a photon has energy.
C)a photon has angular momentum.
D)a photon has parity.
E)a photon has mass.

A)Ruth,because the maximum value of L is $\sqrt { \ell ( \ell + 1 ) } \hbar$ .
B)Ruth,because the orbital angular momentum always lines up with a magnetic field so that $\overrightarrow { \mathbf { L } }$ has its maximum value along the field.
C)Zeke,because the maximum magnitude of $\overrightarrow { \mathbf { L } }$ is L = $\ell\hbar$ .
D)Zeke,because the orbital angular momentum always lines up with a magnetic field so that $\overrightarrow { \mathbf { L } }$ has its maximum value along the field.
E)Neither,because they have interchanged the maximum magnitude of $\overrightarrow { \mathbf { L } }$ , $\sqrt { \ell ( \ell + 1 ) } \hbar$ ,and $\ell\hbar$ ,its maximum projection along a magnetic field direction.

A)-66 $\degree$
B)66 $\degree$
C)24 $\degree$
D)114 $\degree$
E)73 $\degree$

A) $\sqrt { 3 } \hbar$
B) $\frac { \sqrt { 3 } } { 2 } \hbar$
C) $\hbar$ /2.
D) $\hbar$ /2
E) $\frac { 3 } { 4 } \hbar$

A)1s² 2s² 2p⁵ 3s² 3p⁶
B)1s² 2s² 2p⁶ 3s² 3p⁵
C)1s² 2s² 2p⁶ 3s² 3p⁴ 3d¹
D)1s² 2s² 2p⁶ 3s² 3p⁵ 4s¹
E)1s² 2s² 2p⁶ 3s¹ 3p⁷

A) $\Delta$ $\ell$ = 0; $m _ { t }$ = 0, $\pm$ 1.
B) $\Delta$ $\ell$ = 0, $\pm$ 1; $m _ { t }$ = $\pm$ 1.
C) $\Delta$ $\ell$ = 0, $\pm$ 1; $m _ { t }$ = 0, $\pm$ 1.
D) $\Delta$ $\ell$ = $\pm$ 1; $m _ { t }$ = 0, $\pm$ 1.
E) $\Delta$ $\ell$ = $\pm$ 1; $m _ { t }$ = $\pm$ 1.

A) $\frac { 1 } { 2 } \hbar$
B) $\frac { \sqrt { 3 } } { 2 } \hbar$
C) $\hbar$
D)- $\hbar$
E) $- \frac { 1 } { 2 } \hbar$

A)the intrinsic spin of the electrons does not produce a resultant magnetic moment.
B)the orbital motion of the electrons does not produce a resultant magnetic moment.
C)the atom will be an alkali metal.
D)only (a)and (b)are correct.
E)none of the above are correct.

A)no two electrons in the same atom can have the same set of quantum numbers.
B)there is an inherent uncertainty in the position and momentum of a particle.
C)when an atom has orbitals of equal energy,the maximum number of electrons will have unpaired spins.
D)when an atom has orbitals of equal energy,the maximum number of electrons will be paired spins.
E)no two atoms can have the same set of quantum numbers.

A)any direction.
B) $\ell$ discrete directions
C) $\ell$ -1 discrete directions.
D) $\ell$ + 1 discrete directions.
E)2 $\ell$ + 1 discrete directions.

A)electrons from higher shells fill the vacant lower shell
B)electrons fill the vacant valence shell
C)photons are emitted with energies on the order of 10³ eV
D)photons are emitted with wavelengths on the order of 10³ nm

A)Aline,because only atoms,not electrons,can have angular momentum.
B)Bevis,because only atoms,not electrons,can have angular momentum.
C)Neither,because electron spin and orbital angular momentum always cancel exactly.
D)Neither,because the magnetic moment of an atom comes only from the spin of the nucleus.
E)Both,because both the orbital angular momentum and the spins of the electrons contribute to the magnetic moment of an atom.