Question 1150864
Good evening and Happy New Year to all Algebra Tutors!

What is the largest seven-digit number divisible by 44 that can be formed by the digits 1, 2, 3, 4, 6, 7, and 8 each used exactly once?
<pre>I don't know where ALAN got 8 digits. It's clear that there're 7. 
MATHLOVER!, as usual, I don't know how to make sense of what she's TRYING to say. Why on earth did she OMIT 1 and 2, and ADD 0, 5, and 9 when trying
to determine the largest 7-digit number from the given digits? From the given digits, isn't the largest 7-digit number, 8,764,321? Makes NO SENSE at all to me!! 
The correct answer's: {{{highlight_green(matrix(1,3, The, "number:", "8,761,324"))}}}