The table below shows proportional relationships and a matching proportional equation. Complete the table.
The%20text%20reads%2C%20t%20equals%200.23%20n%20dollars
The%20text%20reads%2C%20t%20equals%201.11%20n%20dollars
The%20text%20reads%2C%2017%20pillows%20for%2017.51%20dollars
The%20text%20reads%20equals%200.98%20n%20dollars.
The%20text%20reads%20%2C%20233%20pencils%20for%2053.%2059%20dollars
The%20text%20reads%2C%20t%20equals%200.95%20n%20dollars.
The%20text%20reads%2C%20t%20equals%200.77%20n%20dollars
The%20text%20reads%2C%2038%20canes%20for%2012.54%20dollars
To complete the table, we need to determine the value of t for each given value of n.
1) When n = 1, t = 0.23(1) = 0.23 dollars
2) When n = 1, t = 1.11(1) = 1.11 dollars
3) When n = 17, t = 1.17 dollars (Note: This is not a proportional relationship since the number of items does not equal the price)
4) When n = 1, t = 0.98(1) = 0.98 dollars
5) When n = 233, t = 53.59 dollars
6) When n = 1, t = 0.95(1) = 0.95 dollars
7) When n = 1, t = 0.77(1) = 0.77 dollars
8) When n = 38, t = 0.33 dollars (Note: This is not a proportional relationship since the number of items does not equal the price)
Completed table:
| n | t |
|-----|--------|
| 1 | 0.23 |
| 1 | 1.11 |
| 17 | 1.17 |
| 1 | 0.98 |
| 233 | 53.59 |
| 1 | 0.95 |
| 1 | 0.77 |
| 38 | 12.54 |