Respuesta :
the cost of ketchup is $3.53 & mustard is $0.63 .
Step-by-step explanation:
Here we have , Brianna bought 3 bottles of ketchup and 2 bottles of mustard for $11.85. Logan bought 3 bottles of ketchup and 5 bottles of mustard for $13.73. We need to find the cost of each. Let's find out :
Let cost of ketchup be x and mustard be y than ,
Brianna bought 3 bottles of ketchup and 2 bottles of mustard for $11.85
We have following equation ,
⇒ [tex]3x+2y=11.85[/tex] ..........(1)
Logan bought 3 bottles of ketchup and 5 bottles of mustard for $13.73
We have following equation ,
⇒ [tex]3x+5y=13.73[/tex] ........(2)
Now , (2) - (1) , i.e.
⇒ [tex]3x+5y-(3x+2y)= 13.73-11.85[/tex]
⇒ [tex]3y= 1.88[/tex]
⇒ [tex]y=0.627[/tex]
Putting value of y in (1) :
⇒ [tex]3x+2(0.627)=11.85[/tex]
⇒ [tex]3x=11.85-1.254[/tex]
⇒ [tex]x=3.532[/tex]
Therefore , the cost of ketchup is $3.53 & mustard is $0.63 .
The cost of each bottle of ketchup is $3.532 and cost of each mustard is $0.626
Explanation:
Given:
3 bottles of ketchup + 2 bottles of mustard = $11.85
3 bottles of ketchup + 5 bottles of mustard = $13.73
Cost of each = ?
Let x be the cost of each bottle of ketchup
Let y be the cost of each bottle of mustard
According to the question:
3x + 2y = $11.85
3x + 5y = $13.73
Substituting both the equation, we get:
3x + 2y = $11.85
3x + 5y = $13.73
________________
-3y = -1.88
y = $0.626
Substituting the value of y = $0.626 in equation 1
3x + 2(0.626) = $11.85
3x + 1.252 = $11.85
3x = 10.598
x = $3.532
Therefore, cost of each bottle of ketchup is $3.532 and cost of each mustard is $0.626
