The correct conclusion from the given question is
c) Both a and b must be 0 if a•b = 0.
How to state the conclusion
When there is a multiplication equation of the form a•b = 0, where a and b are numbers, there are a few possible scenarios:
If either a or b is zero: If either a or b is already zero, then the equation holds true because anything multiplied by zero is zero.
If both a and b are zero: In this case, the equation holds true since zero multiplied by zero is also zero.
If neither a nor b is zero: If both a and b are nonzero, then their product would not be zero. In this scenario, the equation a•b = 0 cannot be satisfied.
Therefore, the conclusion that both a and b must be 0 if a•b = 0 is accurate. It covers the cases where either a or b is zero, as well as the case where both a and b are zero.