The sum of the 8 terms of the series 1-1-3-5- ... -13 is -48
The given sequence is:
1,-1,-3, . . -13
and there are 8 terms.
The related series of this sequence is:
1-1-3-5- ... -13
Notice that the series is an arithmetic series with:
first term, a(1) = 1
common difference, d = -1 - (1) = -2
last term, a(8) = -13
To find the sum of the series, use the sum formula:
S(n) = n/2 [(a(1) + a(n)]
Substitute n = 8, a(1) = 1, a(n) = a(8) = -13 into the formula:
S(8) = 8/2 [1 + (-13)]
S(9) = 4 . (-12) = -48
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Answer:
m>2 is the correct answer
Answer:
It's like adding whole numbers, but with a dot. add 75+75=150
Because 150 is more than 100, you add the 1 to the whole numbers, the 6 and the 3. Add 3+6+1=10
So your answer is 10.5
Its C cause the y intercept is -5
