Answer:
[tex]\sum_{2}^{10}25(0.3)^{n+1}=0.9642375[/tex]
Step-by-step explanation:
We have to evaluate the expression:
[tex]\sum_{2}^{10}25(0.3)^{n+1}[/tex]
i.e. it could also be written as:
[tex]25\sum_{2}^{10}(0.3)^{n+1}[/tex]
i.e. we need to evaluate:
[tex]25[(0.3)^3+(0.3)^4+(0.3)^5+(0.3)^6+(0.3)^7+(0.3)^8+(0.3)^9+(0.3)^{10}+(0.3)^{11}][/tex]
Hence, this could be written as:
[tex]=25\times (0.3)^3[1+0.3^1+0.3^2+0.3^3+0.3^4+0.3^5+0.3^6+0.3^7+0.3^8][/tex]
Now, the series inside the parenthesis is a geometric series with first term as 1 and common ration as 0.3.
Hence, we could apply the summation of finite geometric series and get the answer.
We know that the sum of geometric series with n terms and common ratio less than 1 is calculated as:
[tex]S_n=a\times (\dfrac{1-r^n}{1-r})[/tex]
Here a=1 and r=0.3
Hence the sum of geometric series is:
[tex]S_9=1\times (\dfrac{1-0.3^9}{1-0.3})\\\\S_9=1.4285[/tex]
Hence, the final evaluation is:
[tex]=25\times (0.3)^3\times 1.4285\\\\=0.9642375[/tex]
Hence,
[tex]\sum_{2}^{10}25(0.3)^{n+1}=0.9642375[/tex]
