Assertion (A) : For `n = 3,l1` may be `0,1` and `2` and m may be `0, +- 1` and `0,+- 1` , and `+- 2`
Reason (R ) : For each value of n, there are `0` to `(n - 1)` possible value of l for eachvalue of l , there are `0 to +-l` valie of m

Statement : For n=3,l may be 0,1 and 2, and (m) may be 0 , 0, +- 1, and 0, +- 1 and +- 2 . Explanation : For each value of (n) there are 0 to ( n-1) possible values of l , and for each value of l there are (0) to +- 1 values of (m).

Statement -1:- For n=2 the values of l may be 0,1 and m may be 0,+- 1. Statement -2 :- for each value of n, there are 0 to (n-1) possible values of l for each value of la there are 0 to +- l values of m.

Assertion : For l = 2, m_(l) can be -2, -1, 0, +1 and +2. Reason : For a given value of l, (2l + 1) values of m_(l) are possible.

A : in third energy level there is no -f- subshell . R : For n=3 the possible values of l are 0,1,2 and for f- subshell l = 3. .

An orbital has l=4 , what are the possible values of m_(l) ? Hint : m_(l) = -1,"…...",0"…......," +l

For an orbital with n = 2, l = 1, m = 0 there is/are

Describe the orbital having n=2,l=1 and m=0 .

The position and energy of an electron is specified with the help of four quantum numbers namely, principal quantum number (n), azimuthal quantum number (l), magnetic quantum number (m_l) and spin quantum number (m_s) . The permissible values of these are : n = 1,2..... l = 0,1,.....(n-1) m_l = -l,......0,......+l m_s = +1/2 and -1/2 for each value of m_l . The angular momentum of electron is given as sqrt(l(l + 1)) cdot h/(2pi) While spin angular momentum is given as sqrt(s(s+1)) cdot (h/(2pi)) where s = 1/2 The electrons having the same value of n, l and m_l are said to belong to the same orbital. According to Pauli's exclusion principle, an orbital can have maximum of two electrons and these two must have opposite spin. Which of the following statements is not correct ?

If A=[(1,0,0),(0,1,0),(3,4,-1)] and A^(n)=l , then value of n is equal to