Answer:
The nth term of the arithmetic sequence is given by:
[tex]l= a+(n-1)d[/tex] .....[1]
and
the sum of the arithmetic sequence is:
[tex]S_n = \frac{n}{2}(a+l)[/tex] .....[2]
where,
a is the first term
d is the common difference of two consecutive term
l is the last term in the series
As per the statement:
The finite arithmetic series 4+8+12+16...+76
here, a = 4 and
Common difference(d) = 4
Since,
8-4 = 4,
12-8 = 4,
16-12 = 4 and so on
last term of the finite series(l) = 76
Substitute these in [1] we have
[tex]76 = 4+(n-1)4[/tex]
Using distributive property, [tex]a \cdot (b+c) =a\cdot b+ a\cdot c[/tex]
[tex]76 = 4+4n -4[/tex]
Simplify:
[tex]76 = 4n[/tex]
Divide both sides by 4 we have;
19 = n
or
n= 19
Substitute the given value and n = 19 in [2]
[tex]S_{19} = \frac{19}{2}(4+76) = \frac{19}{2} \cdot 80 = 19 \cdot 40 = 760[/tex]
Therefore, the sum of the given finite arithmetic series is, 760
