Given:
-3ab + 4ac – 2ad = -(3ab – 4ac + 2ad)
First, let’s distribute the negativ
Given:
-3ab + 4ac – 2ad = -(3ab – 4ac + 2ad)
First, let’s distribute the negative sign on the right side:
-(3ab – 4ac + 2ad) = -3ab + 4ac – 2ad
Now, you can see that the right side after distributing the negative sign is exactly the same as the original left side:
-3ab + 4ac – 2ad = -3ab + 4ac – 2ad
Since both sides of the equation are identical, this means the equation holds true for all values of a, b, and c. This is because the equation essentially states that the opposite of the expression (3ab – 4ac + 2ad) is equal to the expression itself. This is a property of equality known as the additive inverse, where a number or expression added to its additive inverse equals zero. Therefore, the answer is confirmed.