The MePhone, a new smartphone, is being introduced in the Louisville area. The manufacturer plans to sell 30,000 phones during the first week and expects sales to increase by 8% each week after that find the equation, determine if its aritmetic or geometric, wk 0 is 30,000 wk 1 is 32,400 fill in the rest of the table

Y = 30000 + 0.08x*30000

Factor out 30000:
Eq: Y = 30000(1+0.08x).

Y = The # of phones sold.

x = The # of wks required to sell the phones.

When x = 0, Y=30000(1+0.08*0))= 30,000.
When x = 1, Y=30000(1+0.08*1)= 32,400.
When n = 2, Y=30000(1+0.08*2)= 34,800.

(x,y).
(0,30000)
(1,32400)
(2,34800).
Add as many wks as required.

To find the equation and determine whether it is arithmetic or geometric, we can analyze the given information.

Given:
Week 0 (wk 0): 30,000 phones
Week 1 (wk 1): 32,400 phones

To determine whether the sequence is arithmetic or geometric, we need to check if there is a common difference or a common ratio between the terms.

Arithmetic sequences have a common difference, while geometric sequences have a common ratio.

Let's calculate the difference between wk 1 and wk 0 to determine if it is an arithmetic sequence:

Difference (d) = wk 1 - wk 0 = 32,400 - 30,000 = 2,400

Since there is a constant difference of 2,400 between each term, the sequence is arithmetic.

Now that we know it is an arithmetic sequence, we can determine the equation for the sequence using the formula:

An = A1 + (n - 1) * d

where An is the nth term, A1 is the first term, n is the term number, and d is the common difference.

In this case, A1 = 30,000 and d = 2,400. We need to find the equation for each week (n) beyond wk 1.

Equation for the sequence: An = 30,000 + (n - 1) * 2,400

Now, let's fill in the table for weeks 0 to 4:

| Week (n) | Number of Phones (An) |
|----------|----------------------|
| wk 0 | 30,000 |
| wk 1 | 32,400 |
| wk 2 | 34,800 |
| wk 3 | 37,200 |
| wk 4 | 39,600 |

You can continue filling in the table by substituting the values of n into the equation for An.

Note: The table will need to be continued until you reach the desired number of weeks or until you have enough information.