Answer:
[tex]\boxed{3}[/tex]
Step-by-step explanation:
1. Set up the equations
Let b = the cost of a bagel
and m = the cost of a muffin
You have a system of two equations:
[tex]\begin{cases}(1) & 8b + 5m = 28.85\\(2) & 6b + 7m = 26.09\end{cases}[/tex]
2. Solve the equations
[tex]\begin{array}{lrcll}(3) & 56b + 35m & = & 201.95 &\text{Multiplied (1) by 7}\\(4) & 30b + 35m & = & 130.45 &\text{Multiplied (2) by 5}\\ & 26b & = & 71.50 &\text{Subtracted (4) from (3)}\\(5) & b & = & 2.75 &\text{Divided each side by 26} \\& 6\times 2.75 + 7m & = & 26.09 & \text{Substituted (5) into (2)}\\& 16.50 + 7m& = & 26.09 & \text{Simplified}\\& 7m & = & 9.59 & \text{Subtracted 16.50 from each side}\\& m& = & 1.37 & \text{Divided each side by 7}\\\end{array}[/tex]
3. Calculate the number of muffins Abby bought
Let x = the number of muffins. Then
[tex]\begin{array}{rcl}2b + mx & = & 9.61\\2 \times 2.75 + 1.37x & = & 9.61\\5.50 + 1.37x & = & 9.61\\1.37x & = & 4.11\\x & = & \mathbf{3}\\\end{array}\\\text{Abby bought $\boxed{\mathbf{3}}$ muffins}[/tex]
