# The Egyptian Pharaoh #2

**Number Theory**Level 4

\[ \begin{array} { l l l l l } & & A & B & C & D & E & F \\ \times & & & & & & & 4 \\ \hline & & F & E & D & C & B & A \\ \end{array} \]

The pharaoh, happy after getting the answer to his previous dream thanks the users of Brilliant and then goes to sleep.

However this time again he sees another multiplication (the one above) and once again summons the Brilliant users to come and give the answer to his dream. Being a Brilliant user can you find the six-digit number \(\overline{ABCDEF}\)?

Note: In this problem, the alphabets do not need to correspond to distinct digits.