If in an Ap the sum of 'm' term is equal to 'n' & the Sum of 'n' term is equal to m' then prove that the sum of (m+n) term is - (m+n)
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Answer:
Let a be the first term and d be the common difference of the given A.P. Then,
S
m
=n
⟹
2
m
{2a+(m−1)d}=n
⟹2am+m(m−1)d=2n ...(i)
and, S
n
=m
⟹
2
n
{2a+(n−1)d}
⟹2an+n(n−1)d=2m ...(ii)
Subtracting equation (ii) from equation (i), we get
2a(m−n)+{m(m−1)−n(n−1)}d=2n−2m
⟹2a(m−n)+{(m
2
−n
2
)−(m−n)}d=−2(m−n)
⟹2a+(m+n−1)d=−2 [On dividing both sides by (m−n)] ...(iii)
Now,
S
m+n
=
2
m+n
{2a+(m+n−1)d}
⟹S
m+n
=
2
m+n
(−2) [Using (iii)]
⟹S
m+n
=−(m+n)
Step-by-step explanation:
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