Difference between revisions of "2014 AMC 12A Problems/Problem 2"
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Suppose <math>x</math> is the price of an adult ticket. The price of a child ticket would be <math>\frac{x}{2}</math>. | Suppose <math>x</math> is the price of an adult ticket. The price of a child ticket would be <math>\frac{x}{2}</math>. | ||
| − | <math>5x + 4(x/2) = 7x = 24.50</math> | + | <math>5x + 4(x/2) = 7x &= 24.50</math> |
| − | + | <math>x &= 3.50</math> | |
Plug in for 8 adult tickets and 6 child tickets. | Plug in for 8 adult tickets and 6 child tickets. | ||
<math>8x + 6(x/2) = 8(3.50) + 3(3.50) = 38.50</math> | <math>8x + 6(x/2) = 8(3.50) + 3(3.50) = 38.50</math> | ||
Revision as of 17:48, 7 February 2014
Suppose 
is the price of an adult ticket. The price of a child ticket would be 
.
$5x + 4(x/2) = 7x &= 24.50$ (Error compiling LaTeX. Unknown error_msg)
$x &= 3.50$ (Error compiling LaTeX. Unknown error_msg)
Plug in for 8 adult tickets and 6 child tickets.
