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In this book it has been written:

The $ns$, $(n − 1)d$, and $(n − 2)f$ orbitals are so close to one another in energy, and interpenetrate one another so extensively.

And wikipedia says

The Pauli exclusion principle is the quantum mechanical principle that states that two identical fermions (particles with half-integer spin) cannot occupy the same quantum state simultaneously. In the case of electrons in atom, it can be stated as follows: it is impossible for two electrons of a poly-electron atom to have the same values of the four quantum numbers.

Does this mean that two electrons of an atom can have significant radial probability at the same location even if they are defined by different set of quantam numbers?

In this book it has been written:

The $ns$, $(n − 1)d$, and $(n − 2)f$ orbitals are so close to one another in energy, and interpenetrate one another so extensively.

And in the wikipedia article of Pauli exclusion principle it has been written:

The Pauli exclusion principle is the quantum mechanical principle that states that two identical fermions (particles with half-integer spin) cannot occupy the same quantum state simultaneously. In the case of electrons in atom, it can be stated as follows: it is impossible for two electrons of a poly-electron atom to have the same values of the four quantum numbers.

Does this mean that two electrons of an atom can have significant radial probability at the same location even if they are defined by different set of quantam numbers?

In this book has been writen:

The $ns$, $(n − 1)d$, and $(n − 2)f$ orbitals are so close to one another in energy, and interpenetrate one another so extensively.

And wikipedia says

The Pauli exclusion principle is the quantum mechanical principle that states that two identical fermions (particles with half-integer spin) cannot occupy the same quantum state simultaneously. In the case of electrons in atom, it can be stated as follows: it is impossible for two electrons of a poly-electron atom to have the same values of the four quantum numbers.

Does this mean that two electrons of an atom can have significant radial probability at the same location even if they are defined by different set of quantam numbers?

In this book it has been written:

The $ns$, $(n − 1)d$, and $(n − 2)f$ orbitals are so close to one another in energy, and interpenetrate one another so extensively.

And wikipedia says

The Pauli exclusion principle is the quantum mechanical principle that states that two identical fermions (particles with half-integer spin) cannot occupy the same quantum state simultaneously. In the case of electrons in atom, it can be stated as follows: it is impossible for two electrons of a poly-electron atom to have the same values of the four quantum numbers.

Does this mean that two electrons of an atom can have significant radial probability at the same location even if they are defined by different set of quantam numbers?

In this book,It is writen:

the $ns$, the $(n − 1)d$, and the $(n − 2)f$ orbitals are so close to one another in energy, and interpenetrate one another so extensively

And wikipedia says

The Pauli exclusion principle is the quantum mechanical principle that states that two identical fermions (particles with half-integer spin) cannot occupy the same quantum state simultaneously. In the case of electrons in atom, it can be stated as follows: it is impossible for two electrons of a poly-electron atom to have the same values of the four quantum numbers

Does that mean that two electrons of an atom can have significant radial probability at the same location even if they are defined by different set of quantam no.s?

In this book has been writen:

The $ns$, $(n − 1)d$, and $(n − 2)f$ orbitals are so close to one another in energy, and interpenetrate one another so extensively.

And wikipedia says

The Pauli exclusion principle is the quantum mechanical principle that states that two identical fermions (particles with half-integer spin) cannot occupy the same quantum state simultaneously. In the case of electrons in atom, it can be stated as follows: it is impossible for two electrons of a poly-electron atom to have the same values of the four quantum numbers.

Does this mean that two electrons of an atom can have significant radial probability at the same location even if they are defined by different set of quantam numbers?