Answer:
[tex]\boxed{43}[/tex]
Step-by-step explanation:
I think the easiest way to solve this problem is by brute force: trial and error.
We must find numbers that when divided by
Here is a list of multiples of the integer n that satisfy the three conditions. [tex]\begin{array}{c|ccc}\mathbf{n} & \mathbf{4n+ 3} & \mathbf{5n + 3} & \mathbf{6n + 1}\\1 & 7 & 8 & 7\\2 & 11 & 13 & 13\\3 & 15 & 18 & 19\\4 & 19 & 23 & 25\\5 & 23 & 28 & 31\\6 & 27 & 33 & 37\\7 & 31 & 38 & \mathbf{43}\\8 & 35 & \mathbf{43} & 49\\9 & 39 & 48 & 55\\10 & \mathbf{43} & 53 & 61\\\end{array}\\\text{The only number that is common to all three lists is $\mathbf{43}$.}\\\text{The smallest possible number of muffins Mr. Baker could have baked is $\boxed{\mathbf{43}}$.}[/tex]
Check:
[tex]43 \div 4 = 10R3\\43 \div5 = 8R3\\43 \div 6 = 7R1[/tex]
OK .
