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31 votes
31 votes
Find sum of arithmetic series where a1 = 7, n=31, nth a =127

User JWL
by
2.7k points

2 Answers

21 votes
21 votes

Answer:

Sum of arithmetic series is
2077

Explanation:

We have
nth term of arithmetic sequence


a+(n-1)d

Here


a+(n-1)d=127\\\\7+(31-1)d=127\\\\d=(120)/(30) \\\\=4

Sum of arithmetic sequence
=(n)/(2) (2a+(n-1)d)


=(31)/(2) (2*7+(31-1)4)\\\\=(31)/(2) (14+120)\\\\=31*67\\\\=2077

User Margery
by
2.9k points
26 votes
26 votes

Answer:

The sum of arithmetic series is 2077.

Step-by-step explanation:

Solution :

Here we have provided that :

  • »»
    \rm{a_1} = 1
  • »»
    \rm{n} = 31
  • »»
    \rm{a_n} = 127

We need to find :

  • »» The sum of arithmetic series.

Here's the required formula to find the sum of arithmetic series :


\longrightarrow{\pmb{\sf S = (n)/(2) \Big(a_1 + a_n \Big)}}

Substituting all the given values in the formula to find the sum of arithmetic series :


{\longrightarrow{\sf S = (n)/(2) \Big(a_1 + a_n \Big)}}


{\longrightarrow{\sf S = (31)/(2) \Big(7 + 127 \Big)}}


{\longrightarrow{\sf S = (31)/(2) \Big(134 \Big)}}


{\longrightarrow{\sf S = (31)/(2) * 134 }}


{\longrightarrow{\sf S = \frac{31}{\cancel{2}} * \cancel{134 }}}


{\longrightarrow{\sf S = 31 * 67}}


{\longrightarrow{\sf S = 2077}}


\star \: {\underline{\boxed{\sf{\red{S = 2077}}}}}

Hence, the sum of arithmetic series is 2077.


\rule{300}{1.5}

User HaveSpacesuit
by
2.2k points
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