Answer:
$8
Explanation:
Let a and s represent the prices of adult and student tickets, respectively. The relations described by the problem statement can be written ...
9a +13s = 212
4a +15s = 168
Using Cramer's method, we can find the value of s to be ...
s = (212·4 -168·9)/(13·4 -15·9) = -664/-83 = 8
The price of a student ticket is $8.
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Comment on Cramer's method
For the equations ...
the solutions can be written as ...
- ∆ = bd-ea
- x = (bf-ec)/∆
- y = (cd-fa)/∆
This method is useful when the equation's coefficients don't lend themselves to "nice" arithmetic or when the value of only one variable is needed (as here).
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If you look up "Cramer's Method" in Wikipedia or other sources, you will likely find that the signs of the differences are reversed. That is, ...
x = (ce-bf)/(ae-bd)
This makes no difference to the result of the calculation. The variable ordering shown here can be remembered as a pattern of Xs when compared to the locations of the coefficients in the given equations. Often, this permits the problem to be completely solved mentally.