Answer:
The correct option is a. 26³*21
Step-by-step explanation:
The question states that the last of the four letters must be a consonant and we have a total of 21 consonants (26 - 5) out of the 26 letters in the alphabets. So, we have a possibility of 21 letters that can be placed at the fourth position.
The remaining three positions of the 4-letter initial can be a combination of all the 26 alphabets which means we have a possibility of 26 letters for each of the first 3 positions.
The number of distinct 4-letter initials that can be formed are:
26 x 26 x 26 x 21
= 26³ x 21
Note: The question doesn’t specify that the letters used in the combination must be distinct hence we have considered all 26 alphabets to be placed at the first three positions.