An infinite sequence of real numbers a(n) is defined for all integers n as follows:

For example,

a(0) =

1 1!

+

1 2!

+

1 3!

+ ... = e − 1

a(1) =

e − 1 1!

+

1 2!

+

1 3!

+ ... = 2e − 3

a(2) =

2e − 3 1!

+

e − 1 2!

+

1 3!

+ ... =

7 2

e − 6

with e = 2.7182818... being Euler's constant.

It can be shown that a(n) is of the form

A(n) e + B(n) n!

for integers A(n) and B(n).

For example a(10) =

328161643 e − 652694486 10!

.

Find A(10⁹) + B(10⁹) and give your answer mod 77 777 777.