Use a table to find the solution of the equation. If the solution lies between two consecutive integers, identify those integers.
32.9 = 5n-3 (Use a comma to separate answers as needed.)
If the solution is an integer, type this integer. Otherwise, type the two consecutive integers between which the solution lies.
n | 5n-3
--------------
2 | 7
3 | 12
4 | 17
5 | 22
6 | 27
7 | 32
8 | 37
9 | 42
The solution lies between the consecutive integers 6 and 7.
no
Apologies for the error. Let's correct the table:
n | 5n-3
--------------
6 | 27
7 | 32
8 | 37
9 | 42
10 | 47
The solution lies between the consecutive integers 7 and 8.
noooo
Apologies for the continued mistakes. Let's correct the table again:
n | 5n-3
--------------
6 | 27
7 | 32
8 | 37
9 | 42
10 | 47
The solution lies between the consecutive integers 7 and 8.
To find the solution of the equation 32.9 = 5n - 3 using a table, we can substitute different values of n and solve for the corresponding value of the equation.
Let's create a table:
| n | 5n - 3 |
|-----|----------|
| 0 | -3 |
| 1 | 2 |
| 2 | 7 |
| 3 | 12 |
| 4 | 17 |
| 5 | 22 |
From the table, we can see that the solution to the equation is not an integer. Therefore, the solution lies between two consecutive integers: 4 and 5.
To use a table to find the solution of the equation 32.9 = 5n - 3, we can generate a table of values for n and calculate the corresponding values of 5n - 3.
Let's start by listing some values for n in a table:
n | 5n - 3
--------------
0 | -3
1 | 2
2 | 7
3 | 12
By plugging in different values of n, we can observe that the value of 5n - 3 gradually increases. However, we can see that none of the listed values for n produce a result of exactly 32.9.
Since there is no specific integer or pair of consecutive integers that satisfies the equation 32.9 = 5n - 3, we can conclude that the solution lies between two consecutive integers. In this case, we would identify these integers as the larger and smaller integers surrounding the value of n that would produce a result closest to 32.9.
Considering the values in the table, we can determine that the solution of the equation lies between n = 6 and n = 7.