According to the Transitive Property of Equality, if TX = XY and XY = YZ, then TX = ___.
According to the Transitive Property of Equality, if TX = XY and XY = YZ, then we can conclude that TX = YZ.
According to the Transitive Property of Equality, if TX = XY and XY = YZ, we can conclude that TX = YZ.
According to the Transitive Property of Equality, if we have the relation TX = XY and XY = YZ, then we can conclude that TX = YZ.
To understand why this is the case, let's break it down step by step:
1. The first statement tells us that TX is equal to XY.
2. The second statement tells us that XY is equal to YZ.
By substituting the second statement into the first statement, we can see that TX is equal to YZ. This is because if XY is equal to both TX and YZ, then by the transitive property, TX must be equal to YZ.
So, to answer the question, if TX = XY and XY = YZ, then TX = YZ.