Please help me??? Que : 18 ????
Answers
Answer:
Step-by-step explanation:
Sum of m terms of an A.P. = m/2 [2a + (m -1)d]
Sum of n terms of an A.P. = n/2 [2a + (n -1)d]
m/2 [2a + (m -1)d] / n/2 [2a + (n -1)d] = m:n
⇒ [2a + md - d] / [2a + nd - d] = m/n
⇒ 2an + mnd - nd = 2am + mnd - md
⇒ 2an - 2am = nd - md
⇒ 2a (n -m) = d(n - m)
⇒ 2a = d
Ratio of m th term to nth term:
[a + (m - 1)d] / [a + (n - 1)d]
= [a + (m - 1)2a] / [a + (n - 1)2a]
= a [1 + 2m - 2] / a[1 + 2n -2]
= (2m - 1) / (2n -1)
So, the ratio of mth term and the nth term of the arithmetic series is (2m - 1):(2n -1).
Hope It helps you my friend
sum of m terms of an A.P.=m/2[2a+(m-1)d]
sum of n terms of an A.P.=n/2[2a+(n-1)d]
m/2 [2a+(m-1)d]/ n/2 [2a+(n-1)d]=m:n
[2a + md - d] / [ 2a + md - d]= m/n
2an + mnd - nd = 2am + mnd - md
2an - 2am = nd - md
2a (n-m)=d(n-m)
2a=d
Radia of m th term to n th term:
[a +(m-1)d] / [a +(n-1)d]