Answer:
The required sum is 4214.
Step-by-step explanation:
We are given the following in the question:
An arithmetic sequence with first term a and common difference d.
The sum of n terms of A.P is given by
[tex]S_n = \dfrac{n}{2}(2a + (n-1)d))[/tex]
We have to find:
[tex](1+2+3+...+98+99+100) - (26 + 28+...+60+62)[/tex]
First series:
[tex]a = 1\\d = 1\\a_n = 100\\a + (n-1)d = 100\\\\n = 100\\\\S_{100} = \displaystyle\frac{100}{2}(2(1)+(100-1)1)\\\\S_{100} = 5050[/tex]
Second series:
[tex]a' = 26\\d' = 2\\a'_n = 62\\a' + (n-1)d' = 62\\\\n = 19\\\\S'_{19} = \displaystyle\frac{19}{2}(2(26)+(19-1)2)\\\\S'_{19} = 836[/tex]
The require sum is:
[tex]S_{100}-S'_{19} = 50505 - 836 = 4214[/tex]
Thus, the required sum is 4214.
