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Question
If (m + 1)th term of an A.P is twice the (n + 1)th term, prove that (3m + 1)th term is twice the (m + n + 1)th term.
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Solution
Here, we are given that (m+1)th term is twice the (n+1)th term, for a certain A.P. Here, let us take the first term of the A.P. as a and the common difference as d
We need to prove that `a_(3m + 1) = 2a_(m + n +1)`
So, let us first find the two terms.
As we know,
`a_n = a + (n' - 1)d`
For (m+1)th term (n’ = m+1)
`a_(m + 1) = a + (m + 1 - 1)d`
= a + md
For (n+1)th term (n’ = n+1),
`a_(n +1) = a + (n + 1 -1)d`
= a + nd
Now, we are given that `a_(m + 1) = 2a_(n +1)`
So we get
a + md = 2(a + nd)
a + md = 2a + 2nd
md - 2nd = 2a - a
(m - 2n)d = a ...........(1)
Further, we need to prove that the (3m+1)th term is twice of (m+n+1)th term. So let us now find these two terms,
For (m + n + 1)th term (n' = m + n +1)
`a_(m + n + 1) = a + (m +n +1 -1)d`
= (m - 2n)d + (m + n)d
= md - 2nd + md + nd (Using 1)
= 2md - nd
For (3m+1)th term (n’ = 3m+1),
`a_(3m +1) = a + (3m + 1 -1)d`
= (m - 2n)d + 3md (using 1)
= md - 2nd + 3md
= 4md - 2nd
= 2(2md - nd)
Therfore `a_(3m + 1) = 2a_(m + n + 1)`
Hence proved
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