= (57) + 2(79) + (911) + ... + 2(7375)

= 35 + 263 + 99 + ... + 25475

= 35 + 126 + 99 + ... + 10950

Now, to find the sum of this sequence, we can calculate it using the formula for the sum of the first n terms of an arithmetic sequence:

S = (n/2) * (first term + last term)

In this case, n = 36 (since there are 36 terms in the sequence), the first term is 35, and the last term is 10950.

S = (36/2) * (35 + 10950)

S = 18 * 10985

S = 197730

Therefore, the sum of the sequence is 197730.