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18 votes
18 votes
Find sum of geometric series where a1= 125, r=2/5, n=4

User Jakir Hosen Khan
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1 Answer

22 votes
22 votes

First, we must remember that if a sequence is geometric, that of finding the sum of the first n terms, called Sn, without having to add all the terms.

To do this, we use the following equation:


S_n=(a_1(1-r^n))/(1-r)

Where in this case we have:


\begin{gathered} a_1=125 \\ r=(2)/(5) \\ n=4 \end{gathered}

Now, we replace these values and solve the sum:


\begin{gathered} S_4=125\cdot((1-((2)/(5))^4))/((1-(2)/(5))) \\ S_4=125\cdot((1-(16)/(25)))/((1-(2)/(5))) \\ S_4=125\cdot((609)/(625))/((3)/(5)) \\ S_4=125\cdot(609\cdot5)/(625\cdot3) \\ S_4=125\cdot(203)/(125) \\ S_4=203 \end{gathered}

In conclusion, the sum of the geometric series with a1= 125, r=2/5, n=4​ is a total of 203.

User Heike
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