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Question
In an A.P., the sum of first ten terms is −150 and the sum of its next ten terms is −550. Find the A.P.
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Solution
Here, we are given S10 = -150 and sum of the next ten terms is −550.
Let us take the first term of the A.P. as a and the common difference as d.
So, let us first find a10. For the sum of first 10 terms of this A.P,
First term = a
Last term = a10
So, we know,
an = a + (n-1)d
For the 10th term (n = 10),
a10 = a + (10 -1)d
= a + 9d
So, here we can find the sum of the n terms of the given A.P., using the formula, `S_n = (n/2) (a + l) `
Where, a = the first term
l = the last term
So, for the given A.P,
`S_10 = (10/2 ) (a +a + 9d)`
-150 = 5 (2a + 9d)
-150 = 10a + 45 d
`a = (-150-45d)/10` ................(1)
Similarly, for the sum of next 10 terms (S10),
First term = a11
Last term = a20
For the 11th term (n = 11),
a11 = a + (11 - 1) d
= a + 19d
For the 20th term (n = 20),
a20 = a + (20 - 1) d
= a + 19d
So, for the given A.P,
`S_10 = (10/2) ( a + 10d + a + 19 d)`
-550 = 5(2a + 29d)
-550 = 10a + 145d
`a = (-550-145d)/10` ...............(2)
Now, subtracting (1) from (2),
a-a=`((-550-145d)/10) - ((-150-45d)/10)`
`0 = (-550-145d+150+45d)/10`
0 = -400 -100d
100d = -400
d = -4
Substituting the value of d in (1)
`a = (-150-45(-4))/10`
`=(-150+180)/10`
`=30/10`
= 3
So, the A.P. is 3,-1,-5,-9,... with a=3,d=-4 .
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