Answer:
No, we can not find a unique price for an apple and an orange.
Step-by-step explanation:
Let x be the price of each apple and y be the price of each orange.
We have been given that a fruit stand charge $5.30 for 1 apple and 1 orange. We can represent this information as:
[tex]x+y=5.30...(1)[/tex]
We are also told that they plan to charge $14 for 2 apples and 2 oranges. We can represent this information as:
[tex]2x+2y=14...(2)[/tex]
Upon dividing equation (2) by 2 we will get,
[tex]x+y=7...(2)[/tex]
Upon converting our equations into slope-intercept form we will get,
[tex]y=-x+5.30[/tex]
[tex]y=-x+7[/tex]
We can see that slope for both lines in -1, but both lines have different y-intercept, so these lines are parallel lines.
Since parallel lines do not intersect, therefore, we can not find a unique price for an apple and an orange.
