485,817 views
18 votes
18 votes
Can I get some assistance with setting this problem up please?

Can I get some assistance with setting this problem up please?-example-1
User Ari Braginsky
by
2.3k points

1 Answer

20 votes
20 votes

Step 1. The sequence that we have in the table is:


5,\text{ 10, 20, ...}

As you can see the number doubles each time.

We require to find the expression that represents the sum for term 3 through term 9 in sigma notation.

Step 2. First, since the summation has to be from term 3 to term 9, the sigma notation should look as follows:


\sum_{n\mathop{=}3}^9

This discards options 1 and 3.

Step 3. Now we need to find an expression that represents the sum of the terms. If we continue the sequence the numbers would be:


5,10,20,40,80,...

We can also express this as 5 multiplied by a power of 2:


5\cdot2^0+5\cdot2^1+5\cdot2^3+...

That is because

2^0=1

2^1=2

2^2^4

.

.

.

Therefore, the result of the multiplications:


undefined

This can be simplified to:


5(2)^(n-1)

Step 4. The final expression is:


\sum_{n\mathop{=}3}^95(2)^(n-1)

Which is shown in the second option.

Answer:


\sum_{n\mathop{=}3}^95(2)^(n-1)

User MrCarnivore
by
3.0k points