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Question
The first and last term of an A.P. are a and l respectively. If S is the sum of all the terms of the A.P. and the common difference is given by \[\frac{l^2 - a^2}{k - (l + a)}\] , then k =
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Solution
In the given problem, we are given the first, last term, sum and the common difference of an A.P.
We need to find the value of k
Here,
First term = a
Last term = l
Sum of all the terms = S
Common difference (d) = `(l^2 - a^2)/(k - ( l +a ))`
Now, as we know,
l =a + ( n -1) d .....................(1)
Further, substituting (1) in the given equation, we get
` d = ([a + (n-1) d]^2 - a^2)/( k - {[a + (n -1)d] + a})`
`d = (a^2 +[(n-1)d]^2 + 2a (n-1)d - a^2)/(k - {[a +(n-1)d] + a})`
` d = ([(n - 1)d]^2 + 2a (n-1)d)/(k - {[a + (n -1)d ] +a})`
Now, taking d in common, we get,
` d = ([(n-1)d]^2 + 2a(n -1)d)/(k - {[a +(n-1)d]+ a})`
`1 = ((n-1)^2 d + 2a(n-1))/(k - [2a + (n-1)d])`
k - [2a + (n-1) d ] = (n -1)2 d + 2a(n-1)
Taking (n-1) as common, we get,
k - [2a + (n - 1)d ] = (n -1) [(n - 1) d + 2a]
k = n [(n -1)d + 2a]-[(n-1) d + 2a]+[2a + (n -1) d]
k = n [( n - 1) d + 2a]
Further, multiplying and dividing the right hand side by 2, we get,
`k = (2) n/2 [(n-1) d + 2a]`
Now, as we know, `S = n/2 [(n - 1) d + 2a]`
Thus,
k = 2S
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