SOLUTION: Find five consecutive terms of an arithmetic progression whose sum is 115 and sum of squares of its second and fourth term is 1156.

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Question 1012886: Find five consecutive terms of an arithmetic progression whose sum is 115 and sum of squares of its second and fourth term is 1156.
Answer by fractalier(6550) About Me  (Show Source):
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The five terms are a, a+d, a+2d, a+3d and a+4d.
If we add them we get
5a + 10d = 115 or
a + 2d = 23 or
a = 23 - 2d
We also have
(a+d)^2 + (a+3d)^2 = 1156
We can substitute from before into this and get
(23 - 2d + d)^2 + (23 - 2d + 3d)^2 = 1156
(23 - d)^2 + (23 + d)^2 = 1156
529 - 46d + d^2 + 529 + 46d + d^2 = 1156
2d^2 + 1058 = 1156
2d^2 = 98
d^2 = 49
d = 7, -7
a is then 23 - 2(7) = 9 or 23 - 2(-7) = 37
Thus our two possibilities appear to be
9, 16, 23, 30, 37 and
37, 30, 23, 16, 9