Find the sum of the positive terms of the arithmetic sequence 85, 78, 71, ...
Answers
Answer:
Answer:
Given:
A.P = 85, 78, 71, . . . .
The first term of the A.P (a₁) is 85
Now,
78 - 85 = -7
71 - 78 = -7
Common difference is (d) = -7
By looking at the further numbers of the A.P, we get to know that (7) decreasing in each number, after some point negative number will arise,
We know that,
aₙ = a + (n-1)d
a₁₀ = 85 + (10 - 1)(-7)
a₁₀ = 85 + (9)(-7)
a₁₀ = 85 - 63
a₁₀ = 22
And,
a₁₅ = 85 + (15 - 1)(-7)
a₁₅ = 85 + (14)(-7)
a₁₅ = 85 - 98
a₁₅ = -13
And,
a₁₃ = 85 + (13 - 1)(-7)
a₁₃ = 85 + (12)(-7)
a₁₃ = 85 - 84
a₁₃ = 1
And,
a₁₄ = 85 + (14 - 1)(-7)
a₁₄ = 85 + (13)(-7)
a₁₄ = 85 - 91
a₁₄ = -6
Therefore,
a₁₃ = 1 and a₁₄ = -6
So, till a₁₃ = 1 positive terms are there,
We have to find the sum of 13 positive numbers.
Formula,
\boxed{\sf S_{n}=\frac{n}{2}[2a+(n-1)d]}
S
n
=
2
n
[2a+(n−1)d]
\sf S_{13}=\frac{13}{2}[2(85)+(13-1)(-7)]S
13
=
2
13
[2(85)+(13−1)(−7)]
\sf S_{13}=\frac{13}{2}[170+(12)(-7)]S
13
=
2
13
[170+(12)(−7)]
\sf S_{13}=\frac{13}{2}[170-84]S
13
=
2
13
[170−84]
\sf S_{13}=\frac{13}{2}\times 86S
13
=
2
13
×86
\sf S_{13}=13 \times 43S
13
=13×43
\sf S_{13}=559S
13
=559
Hence,
The sum of the positive terms of the A.P is 559
Explanation:
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85, 78, 71,… is an A.P.
uₙ = a + (n-1) d
u₁ = a = 85
d = u₂ - u₁ = 78 - 85 = -7
Since we have to sum the positive terms,our terms must be greater than 0.
uₙ > 0
85 +(n-1) (-7) > 0
85 - 7n + 7 > 0
- 7n > - 92
7n < 92
n < 13.14
Thus, the first 13 terms are the positive terms.
Sₙ = n/2 {2a + (n-1)d}
S₁₃ = 13/2 {2(85) + 12(-7)}
S₁₃ = 13 { 85 -42 }
S₁₃ = 13 { 43 }
S₁₃ = 559