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What are the first three terms of the Gp of which the common ratio is -⅔ and S6 is 133

User Noffls
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1 Answer

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Given that S6 is 133 and the common ratio (r) is -2/3.

We know that the sum of n terms of a gp whose common ratio is less than 1 is


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

So,


\begin{gathered} 133=(a(1-(-(2)/(3))^6))/(1-(-(2)/(3))) \\ 133=(a(1-(64)/(729)))/(1+(2)/(3)) \\ 133=(a((665)/(729)))/((5)/(3)) \\ 133=(a(133))/(243) \\ a=243 \end{gathered}

Now, we have known that the first term of the gp is 243.

So, the second term is:


ar=243*(-(2)/(3))=-162

The third term is:


ar^2=243*(-(2)/(3))^2=108

Thus, the first three terms are 243, -162, 108.

User Vahid Garousi
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