Total number of nodes \({\rm{ = n - 1}}\) As the value of n is 5 for 5s, 5p, and 5d, all possess same number of total nodes.
CHXI02:STRUCTURE OF ATOM
307525
The number of radial nodes of \({\rm{3s}}\) and \({\rm{2p}}\) orbitals are respectively
1 \({\rm{2,0}}\)
2 \({\rm{0,2}}\)
3 \({\rm{1,2}}\)
4 \({\rm{2,1}}\)
Explanation:
Number of radial nodes \({\rm{ = }}\left( {{\rm{n - l - 1}}} \right)\) For \({\rm{3s:n = 3,l = 0}}\) (Number of radial node \({\rm{ = 2}}\)) For \({\rm{2p:}}\,\,{\rm{n = 2,l = 1}}\) (Number of radial node \({\rm{ = 0}}\))
CHXI02:STRUCTURE OF ATOM
307526
The maximum probability of finding electron in the \({{\rm{d}}_{{\rm{xy}}}}\) orbital is
1 Along the x axis
2 Along the y axis
3 At an angle of \({\rm{45^\circ }}\) from the x and y axis
4 At an angle of \(90^\circ \) from the x and y axis
Explanation:
The lobes of \({{\rm{d}}_{{\rm{xy}}}}\) orbital are oriented in between the axes at an angle \({\rm{45^\circ }}\). So the probability of finding electron in \({{\rm{d}}_{{\rm{xy}}}}\) orbital is maximum at an angle of \({\rm{45^\circ }}\) from x- and y-axis.
CHXI02:STRUCTURE OF ATOM
307527
\({{\rm{\psi }}^2} = 0\) represents
1 node
2 orbital
3 angular wave function
4 wave function
Explanation:
\({\psi ^{\rm{2}}} = 0\), means probability of finding an electron in the orbital is zero i.e. it represents a node.
Total number of nodes \({\rm{ = n - 1}}\) As the value of n is 5 for 5s, 5p, and 5d, all possess same number of total nodes.
CHXI02:STRUCTURE OF ATOM
307525
The number of radial nodes of \({\rm{3s}}\) and \({\rm{2p}}\) orbitals are respectively
1 \({\rm{2,0}}\)
2 \({\rm{0,2}}\)
3 \({\rm{1,2}}\)
4 \({\rm{2,1}}\)
Explanation:
Number of radial nodes \({\rm{ = }}\left( {{\rm{n - l - 1}}} \right)\) For \({\rm{3s:n = 3,l = 0}}\) (Number of radial node \({\rm{ = 2}}\)) For \({\rm{2p:}}\,\,{\rm{n = 2,l = 1}}\) (Number of radial node \({\rm{ = 0}}\))
CHXI02:STRUCTURE OF ATOM
307526
The maximum probability of finding electron in the \({{\rm{d}}_{{\rm{xy}}}}\) orbital is
1 Along the x axis
2 Along the y axis
3 At an angle of \({\rm{45^\circ }}\) from the x and y axis
4 At an angle of \(90^\circ \) from the x and y axis
Explanation:
The lobes of \({{\rm{d}}_{{\rm{xy}}}}\) orbital are oriented in between the axes at an angle \({\rm{45^\circ }}\). So the probability of finding electron in \({{\rm{d}}_{{\rm{xy}}}}\) orbital is maximum at an angle of \({\rm{45^\circ }}\) from x- and y-axis.
CHXI02:STRUCTURE OF ATOM
307527
\({{\rm{\psi }}^2} = 0\) represents
1 node
2 orbital
3 angular wave function
4 wave function
Explanation:
\({\psi ^{\rm{2}}} = 0\), means probability of finding an electron in the orbital is zero i.e. it represents a node.
Total number of nodes \({\rm{ = n - 1}}\) As the value of n is 5 for 5s, 5p, and 5d, all possess same number of total nodes.
CHXI02:STRUCTURE OF ATOM
307525
The number of radial nodes of \({\rm{3s}}\) and \({\rm{2p}}\) orbitals are respectively
1 \({\rm{2,0}}\)
2 \({\rm{0,2}}\)
3 \({\rm{1,2}}\)
4 \({\rm{2,1}}\)
Explanation:
Number of radial nodes \({\rm{ = }}\left( {{\rm{n - l - 1}}} \right)\) For \({\rm{3s:n = 3,l = 0}}\) (Number of radial node \({\rm{ = 2}}\)) For \({\rm{2p:}}\,\,{\rm{n = 2,l = 1}}\) (Number of radial node \({\rm{ = 0}}\))
CHXI02:STRUCTURE OF ATOM
307526
The maximum probability of finding electron in the \({{\rm{d}}_{{\rm{xy}}}}\) orbital is
1 Along the x axis
2 Along the y axis
3 At an angle of \({\rm{45^\circ }}\) from the x and y axis
4 At an angle of \(90^\circ \) from the x and y axis
Explanation:
The lobes of \({{\rm{d}}_{{\rm{xy}}}}\) orbital are oriented in between the axes at an angle \({\rm{45^\circ }}\). So the probability of finding electron in \({{\rm{d}}_{{\rm{xy}}}}\) orbital is maximum at an angle of \({\rm{45^\circ }}\) from x- and y-axis.
CHXI02:STRUCTURE OF ATOM
307527
\({{\rm{\psi }}^2} = 0\) represents
1 node
2 orbital
3 angular wave function
4 wave function
Explanation:
\({\psi ^{\rm{2}}} = 0\), means probability of finding an electron in the orbital is zero i.e. it represents a node.
Total number of nodes \({\rm{ = n - 1}}\) As the value of n is 5 for 5s, 5p, and 5d, all possess same number of total nodes.
CHXI02:STRUCTURE OF ATOM
307525
The number of radial nodes of \({\rm{3s}}\) and \({\rm{2p}}\) orbitals are respectively
1 \({\rm{2,0}}\)
2 \({\rm{0,2}}\)
3 \({\rm{1,2}}\)
4 \({\rm{2,1}}\)
Explanation:
Number of radial nodes \({\rm{ = }}\left( {{\rm{n - l - 1}}} \right)\) For \({\rm{3s:n = 3,l = 0}}\) (Number of radial node \({\rm{ = 2}}\)) For \({\rm{2p:}}\,\,{\rm{n = 2,l = 1}}\) (Number of radial node \({\rm{ = 0}}\))
CHXI02:STRUCTURE OF ATOM
307526
The maximum probability of finding electron in the \({{\rm{d}}_{{\rm{xy}}}}\) orbital is
1 Along the x axis
2 Along the y axis
3 At an angle of \({\rm{45^\circ }}\) from the x and y axis
4 At an angle of \(90^\circ \) from the x and y axis
Explanation:
The lobes of \({{\rm{d}}_{{\rm{xy}}}}\) orbital are oriented in between the axes at an angle \({\rm{45^\circ }}\). So the probability of finding electron in \({{\rm{d}}_{{\rm{xy}}}}\) orbital is maximum at an angle of \({\rm{45^\circ }}\) from x- and y-axis.
CHXI02:STRUCTURE OF ATOM
307527
\({{\rm{\psi }}^2} = 0\) represents
1 node
2 orbital
3 angular wave function
4 wave function
Explanation:
\({\psi ^{\rm{2}}} = 0\), means probability of finding an electron in the orbital is zero i.e. it represents a node.