1 Answer

GeralexGR · Answer 1 · 2023-06-24T06:27:22+0000

The sequence is arithmetic, so there is a constant difference d between consecutive terms such that

a_(100) = a_(99) + d

a_(100) = (a_(98) + d) + d = a_(98) + 2d

a_(100) = (a_(97) + d) + 2d = a_(97) + 3d

and so on, down to

a_(100) = a_1 + 99d

(notice the pattern of 100 = 99 + 1 = 98 + 2 = 97 + 3 = … = 1 + 99)

Solve for d :

$307 = 15 + 99d \implies 99d = 292 \implies d = (292)/(99)$

Now, the sum of the first 100 terms of this sequence is

$\displaystyle \sum_(n=1)^(100) a_n = \sum_(n=1)^(100) \left(15 + (292)/(99)(n-1)\right) = \boxed{16100}$

which follows from the well-known sums

$\displaystyle \sum_(n=1)^N 1 = N$

$\displaystyle \sum_(n=1)^N n = \frac{N(N+1)}2$

Please log in or register to add a comment.