EXPLANATION
If the first two terms of an arithmetic sequence are 7 and 4, then we know that an arithmetic sequence has a constant difference d and is defined by
[tex]a_n=a_1+(n+1)d[/tex]Check wheter the difference is constant:
Compute the differences of all the adjacent terms:
[tex]d=a_{n+1}-a_n[/tex]Replacing terms:
4-7 = -3
The difference between all of the adjacent terms is the same and equal to
d = -3
The first element of the sequence is
[tex]a_1=7[/tex][tex]a_n=a_1+(n+1)d[/tex]Therefore, the nth term is computed by
d= -3
[tex]a_n=7+\text{ (n-1)}\cdot(-3)[/tex]
Refine
d= -3 ,
[tex]a_n=-3n+10[/tex]
Now, replacing n=7
[tex]a_7=-3\cdot7+10\text{ = -11}[/tex]So, the answer is -11.
