The number of terms of a harmonic sequence is even.

The sum of the terms in the odd places (First term + Third Term + Fifth Term + ...and so on) is 2625, and:
The sum of the terms in the even places (Second Term + Fourth Term + Sixth Term + ... and so on) is 4224; and:

Given that the last term exceeds the first by 2205, then identify the terms of the said sequence.