A dozen of doughnuts cost $5 and a dozen of croissants cost $6.
Step-by-step explanation:
Let,
Cost of 1 dozen doughnuts = x
Cost of 1 dozen croissants = y
According to given statement;
7x+3y = 53 Eqn 1
x+5y = 35 Eqn 2
Multiplying Eqn 2 by 7
[tex]77(x+5y = 35)\\x+35y=245\ \ \ Eqn\ 3[/tex]
Subtracting Eqn 1 from Eqn 3
[tex](7x+35y)-(7x+3y)=245-53\\7x+35y-7x-3y=192\\32y=192[/tex]
Dividing both sides by 32
[tex]\frac{32y}{32}=\frac{192}{32}\\y=6\\[/tex]
Putting y=6 in Eqn 2
[tex]x+5(6)=35\\x+30=35\\x=35-30\\x=5[/tex]
A dozen of doughnuts cost $5 and a dozen of croissants cost $6.
Keywords: linear equation, elimination method
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