For emission line of atomic hydrogen from `n_(i)=8` to `n_(f)=n,` the plot of wave number `(barv)` against`((1)/(n^(2)))` will be (The Rydberg constant, `R_(H)` is in wave number unit)

In terms of Rydberg's constant R , the wave number of the first Balman line is

For balmer series in the spectrum of atomic hydrogen the wave number of each line is given by bar(V)=R_(H)(1)/(n_(1)^(2))-(1)/(n_(2)^(2)) where R_(H) is a constant and n_(1) and n_(2) are integers which of the following statement (S) is / are correct 1 as wavelength decreases the lines in the series converge 2 The integer n_(1) is equal to 2 3 The ionization energy of hydrogen can be calculated from the wave number of these lines 4 The line of longest wavelength corresponds to n_(2)=3

For balmer series in the spectrum of atomic hydrogen the wave number of each line is given by bar(V) = R[(1)/(n_(1)^(2))-(1)/(n_(2)^(2))] where R_(H) is a constant and n_(1) and n_(2) are integers. Which of the following statements (s), is (are correct) 1. As wave length decreases the lines in the series converge 2. The integer n_(1) is equal to 2. 3. The ionisation energy of hydrogen can be calculated from the wave numbers of three lines. 4. The line of shortest wavelength corresponds to = 3.

When a transition of electron in He^(+) takes place from n_(2)" to "n_(1) then wave number in terms of Rydberg constant R will be ("Given "n_(1)+n_(2)=4, n_(2)-n_(1)=2)

The wave number of first emission line in the atomic spectrum of hydrogen in the Balmer series is

The emission series of hydrogen atom is given by (1)/(lambda)=R((1)/(n_(1)^(2))-(1)/(n_(2)^(2))) where R is the Rydberg constant. For a transition from n_(2) to n_(1) , the relative change Deltalambda//lambda in the emission wavelength if hydrogen is replaced by deuterium (assume that the mass of proton and neutron are the same and approximately 2000 times larger than that of electrons) is