Answer:
Step-by-step explanation:
The converse of the statement "If a=b and b=c, then a=c" is "If a=c, then a=b and b=c."
The original statement states that if two quantities, a and b, are equal, and b and c are also equal, then a and c must be equal as well.
The converse of this statement flips the order and states that if a and c are equal, then a and b are equal and b and c are equal.
However, the converse of a statement is not always true. In this case, the converse is actually true.
If a=c, then a and b are equal: This is based on the assumption that a=b.
If a=b, and b=c, then b and c are equal: This is based on the assumption that b=c.
So, in summary, the converse of the statement "If a=b and b=c, then a=c" is "If a=c, then a=b and b=c" and it is true.
That is sadly the only explination I can give you, sorry! :<
