Question 1

Can someone help me with this?

Question 2

Its a GP given by 2+6+18

First term=a=2

Common ratio=r=

$\\ \bull\tt\looparrowright (6)/(2)=3$

Now

$\\ \bull\tt\looparrowright S_n=728$

$\\ \bull\tt\looparrowright (a(r^n-1))/(r-1)=728$

$\\ \bull\tt\looparrowright (2(3^n-1))/(3-1)=728$

$\\ \bull\tt\looparrowright (2(3^n-1))/(2)=728$

Cancel 2

$\\ \bull\tt\looparrowright 3^n-1=728$

$\\ \bull\tt\looparrowright 3^n=728+1$

$\\ \bull\tt\looparrowright 3^n=729$

$\\ \bull\tt\looparrowright 3^n=3^6$

$\\ \bull\tt\looparrowright n=6$

Question 3

Answer:

Let 'a' be the first term, 'r' be the common ratio and 'n' be the number of terms

Series = 2+6+18.......= 2+2•3¹+ 2•3².......= 728

Now,

$Sum = \frac{a( {r}^(n) - 1) }{(r - 1)} \\$

So,

$\frac{a( {r}^(n) - 1)}{(r - 1)} = 728 \\ \frac{2( {3}^(n) - 1) }{(3 - 1)} = 728 \\ \frac{2( {3}^(n) - 1) }{2} = 728 \\ {3}^(n) - 1 = 728 \\ {3}^(n)=728+1\\ {3}^(n) = 729 \\ {3}^(n) = {3}^(6) \\ \boxed{ n = 6}$

Therefore, number of terms is 6

6 is the right answer.

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