How do you solve the system $4 x - 3 y = 1$ $4x - 3y = 1$ and $12 x - 9 y = 3$ $12x - 9y = 3$ by substitution?

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How do you solve the system $4 x - 3 y = 1$ $4x - 3y = 1$ and $12 x - 9 y = 3$ $12x - 9y = 3$ by substitution?

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Answer 1 · 2015-05-25T07:26:49

Dividing both sides of the second equation by $3$ $3$ we get:

$4 x - 3 y = 1$ $4x-3y = 1$

which is the same as the first equation.

If we attempt to solve the system by substitution, then we will find that all of the terms in $x$ $x$ and $y$ $y$ cancel out, resulting in a true, but otherwise uninformative equation of rational numbers.

For example, if we take the first equation and add $3 y$ $3y$ to both sides, then divide both sides by $4$ $4$ we get:

$x = \frac{3 y + 1}{4}$ $x = (3y + 1)/4$

Substitute this in the second equation:

$3 = 12 x - 9 y = 12 (\frac{3 y + 1}{4}) - 9 y = 3 (3 y + 1) - 9 y = 9 y + 3 - 9 y = 3$ $3 = 12x-9y = 12((3y+1)/4) -9y = 3(3y+1)-9y = 9y+3-9y = 3$

As a result, there are not enough constraints to determine a unique solution, but there are an infinite number of solutions.

These solutions are the points on the line which in slope intercept form is described by the equation:

$y = \frac{4}{3} x + - \frac{1}{3}$ $y = 4/3x + -1/3$

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How do you solve the system $4 x - 3 y = 1$ $4x - 3y = 1$ and $12 x - 9 y = 3$ $12x - 9y = 3$ by substitution?

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How do you solve the system $4 x - 3 y = 1$ $4x - 3y = 1$ and $12 x - 9 y = 3$ $12x - 9y = 3$ by substitution?