Answer:
Step-by-step explanation:
The two purchases can be described by the equations ...
50r +70p = 258
90r +60p = 372
Rewriting these equations in general form facilitates the use of the cross-multiplication method of solving them.
50r +70p -258 = 0
90r +60p -372 = 0
According to the cross-multiplication method, we need three cross-products:
∆1 = (50)(60) -(90)(70) = -3300
∆2 = (70)(-372) -(60)(-258) = -10560
∆3 = (-258)(90) -(-372)(50) = -4620
The solutions are the solutions to the equations ...
1/∆1 = t/∆2 = p/∆3
r = ∆2/∆1 = -10560/-3300 = 3.20
p = ∆3/∆1 = -4620/-3300 = 1.40
The cost per foot of the redwood was $3.20; of the pine, $1.40.
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Additional comment
Here's how this version of the "cross-multiplication" method works. For equations ...
a coefficient array can be written as ...
[tex]\left[\begin{array}{cccc}a&b&c&a\\d&e&g&d\end{array}\right][/tex]
The cross-products of interest are formed from adjacent columns:
[tex]\Delta1=ac-db\\\Delta2=bg-ec\\\Delta3=cd-ga[/tex]
and the solutions are ...
[tex]x=\dfrac{\Delta2}{\Delta1},\quad y=\dfrac{\Delta3}{\Delta1}[/tex]
Using this method requires no more arithmetic operations than solving by substitution or elimination, and may require fewer: 6 products, 3 sums, and 2 quotients are needed.
