State any restrictions on the variables.
3y^2 - 3y/ y - 3
If you mean
3y^2 - 3y/(y - 3)
then y ≠ 3
The given expression is (3y^2 - 3y) / (y - 3).
To determine any restrictions on the variables, we need to look for any values of y that make the denominator equal to zero.
In this case, the denominator is (y - 3). Therefore, the expression will be undefined when (y - 3) = 0.
Solving for y, we find that y = 3.
So, the only restriction on the variable y is that it cannot equal 3.
To determine restrictions on the variables in the expression 3y^2 - 3y / y - 3, we need to consider any conditions that could make the expression undefined or result in division by zero.
In this case, the variable y appears in both the numerator and the denominator of the expression. To avoid division by zero, we need to ensure that the denominator (y - 3) is not equal to zero.
So, the restriction on the variable y is that it cannot take the value of 3. Therefore, y ≠ 3 is the restriction on the variable in the given expression.