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प्रश्न
In an AP given an = 4, d = 2, Sn = −14, find n and a.
Let there be an A.P. with the first term 'a', common difference'. If an a denotes in nth term and Sn the sum of first n terms, find.
n and a, if an = 4, d = 2 and Sn = −14
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उत्तर १
Given that, an = 4, d = 2, Sn = −14
an = a + (n − 1)d
4 = a + (n − 1)2
4 = a + 2n − 2
a + 2n = 6
a = 6 − 2n ...(i)
`S_n = n/2[a+a_n]`
`-14=n/2[a+4]`
−28 = n (a + 4)
−28 = n (6 − 2n + 4) ...{From equation (i)}
−28 = n (− 2n + 10)
−28 = − 2n2 + 10n
2n2 − 10n − 28 = 0
n2 − 5n −14 = 0
n2 − 7n + 2n − 14 = 0
n (n − 7) + 2(n − 7) = 0
(n − 7) (n + 2) = 0
Either n − 7 = 0 or n + 2 = 0
n = 7 or n = −2
However, n can neither be negative nor fractional.
Therefore, n = 7
From equation (i), we obtain
a = 6 − 2n
a = 6 − 2(7)
a = 6 − 14
a = −8
उत्तर २
Here, we have an A.P. whose nth term (an), the sum of first n terms (Sn) and common difference (d) are given. We need to find the number of terms (n) and the first term (a).
Here
Last term (an) = 4
Common difference (d) = 2
Sum of n terms (Sn) = −14
So here we will find the value of n using the formula, an = a + (n - 1)d
So, substituting the values in the above-mentioned formula
4 = a + (n - 1)2
4 = a + 2n - 2
4 + 2 = a + 2n
n = `(6 - a)/2` ...(1)
Now, here the sum of the n terms is given by the formula,
`S_n = (n/2) (a + l)`
Where, a = the first term
l = the last term
So, for the given A.P, on substituting the values in the formula for the sum of n terms of an A.P., we get,
`-14 = (n/2)[a + 4]`
-14(2) = n(a + 4)
`n = (-28)/(a + 4)` ...(2)
Equating (1) and (2), we get,
`(6 - a)/2 = (-28)/(a + 4)`
(6 - a)(a + 4) = -28(2)
6a - a2 + 24 - 4a = -56
-a2 + 2a + 24 + 56 = 0
So, we get the following quadratic equation,
-a2 + 2a + 80 = 0
a2 - 2a - 80 = 0
Further, solving it for a by splitting the middle term,
a2 - 2a - 80 = 0
a2 - 10a + 8a - 80 = 0
a(a - 10) + 8(a - 10) = 0
(a - 10) (a + 8) = 0
So, we get,
a - 10 = 0
a = 10
or
a + 8 = 0
a = -8
Substituting, a = 10 in (1)
n = `(6 - 10)/2`
n = `(-4)/2`
n = -2
Here, we get n as negative, which is not possible. So, we take a = -8
n = `(6 - (-8))/2`
n = `(6 + 8)/2`
n = `14/2`
n = 7
Therefore, for the given A.P. n = 7 and a = -8.
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