# What will be the ratio of the wavelength of the first line to that of the second line of paschen series of H atom? A)256:175 B)175:256 C)15:16 D)24:27

##### 1 Answer

The answer is **(A)**

#### Explanation:

Your tool of choice here will be the **Rydberg equation**, which tells you the *wavelength*,

#1/(lamda) = R * (1/n_f^2 - 1/n_i^2)#

Here

#R# is theRydberg constant, equal to#1.097 * 10^(7)# #"m"^(-1)# #n_i# is theinitial energy levelof the electron#n_f# is thefinal energy levelof the electron

Now, the **Paschen series** is characterized by

The first transition in the Paschen series corresponds to

#n_i = 4" " -> " " n_f = 3#

In this transition, the electron drops from the fourth energy level to the third energy level.

You will have

#1/(lamda_1) = R * (1/3^2 - 1/4^2)#

The second transition in the Paschen series corresponds to

#n_i = 5 " " -> " " n_f = 3#

This time, you have

#1/(lamda_2) = R * (1/3^2 - 1/5^2)#

Now, to get the ratio of the **first line** to that of the **second line**, you need to divide the second equation by the first one.

#(1/(lamda_2))/(1/(lamda_1)) = (color(red)(cancel(color(black)(R))) * (1/3^2 - 1/4^2))/(color(red)(cancel(color(black)(R))) * (1/3^2 - 1/5^2))#

This will be equivalent to

#(lamda_1)/(lamda_2) =(1/9 - 1/25)/ (1/9 - 1/16)#

#(lamda_1)/(lamda_2) = ((25 - 9)/(25 * 9))/((16 - 9)/(16 * 9)) = 16/(25 * color(red)(cancel(color(black)(9)))) * (16 * color(red)(cancel(color(black)(9))))/7 = 16^2/(25 * 7)#

Therefore, you can say that you have

#(lamda_1)/(lamda_2) = 256/175#