An adult ticket costs $205 and a child ticket costs $49.
Hello! Recall you have to write complete questions in order to find exact answers. Here I'll assume the complete question as:
Two families are planning a trip to Disney. The Smith family bought tickets for 2 adults and 3 children for $557. The Jones family bought tickets for 2 adults and 1 child for $459. How much does and adult and child ticket cost?
To solve this problem, we need to write a system of linear equations in two variables. So, we know some facts:
Let:
[tex]x:Cost \ of \ ticket \ per \ adult \\ \\ y: Cost \ of \ ticket \ per \ child[/tex]
For the Smith family:
Cost for the 2 adults:
[tex]2x[/tex]
Cost for the 3 children:
[tex]3y[/tex]
Total cost:
[tex]2x+3y=557[/tex]
For the Jones family:
Cost for the 2 adults:
[tex]2x[/tex]
Cost for the 1 child:
[tex]y[/tex]
Total cost:
[tex]2x+y=459[/tex]
So we have the following system of linear equations:
[tex]\begin{array}{c}(1)\\(2)\end{array}\left\{ \begin{array}{c}2x+3y=557\\2x+y=459\end{array}\right.[/tex]
Subtracting (2) from (1):
[tex]\begin{array}{c}(1)\\(2)\end{array}\left\{ \begin{array}{c}2x+3y=557\\-(2x+y=459)\end{array}\right. \\ \\ \\ \begin{array}{c}(1)\\(2)\end{array}\left\{ \begin{array}{c}2x+3y=557\\-2x-y=-459\end{array}\right. \\ \\ \\ (2x-2x)+(3y-y)=557-459 \\ \\ 2y=98 \\ \\ y=49 \\ \\ \\ Finding \ x \ from \ (1): \\ \\ 2x+3(49)=557 \\ \\ 2x=557-147 \\ \\ 2x=410 \\ \\ x=205[/tex]
Finally, an adult ticket costs $205 and a child ticket costs $49.
System of linear equations: https://brainly.com/question/13799715
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