Respuesta :
Answer: Cost of each hot dog and bratwursts would be $1.1 and $1.35 each.
Step-by-step explanation:
Since we have given that
Cost of each dozen hot dogs be 'x'.
Cost of each dozen bratwursts be 'y'.
The first day they sold 8 dozen hot dogs and 13 dozen bratwursts for $316.20.
So, the equation would be
[tex]8x+13y=\$316.20[/tex]
.The second day they sold 10 dozen hot dogs and 15 dozen bratwursts for a total of $375.00.
So, the equation would be
[tex]10x+15y=\$375.00\\\\2x+3y=\$75[/tex]
So, the equations becomes
[tex]8x+13y=316.20--------------(2)\\\\(2x+3y=75)\times 4\\\\\implies 8x+12y=300------------(1)[/tex]
So, by elimination method, we get that
[tex]8x+13y=316.20\\\\(-)8x+(-)12y=(-)300\\\\--------------\\y=\$16.20[/tex]
Put the value of y in the eq(1), we get that
[tex]2x+3y=75\\\\2x+3(16.20)=75\\\\2x+48.6=75\\\\2x=75-48.60\\\\2x=26.4\\\\x=\dfrac{26.4}{2}\\\\x=\$13.2[/tex]
Hence, the cost of hot dogs would be [tex]\dfrac{13.2}{12}=\$1.1[/tex]
And the cost of bratwursts would be [tex]\dfrac{16.2}{12}=\$1.35[/tex]
