How do you find the point of intersection for $x + y = - 3$ $x+y= -3$ and $x + y = 3$ $x+y=3$ ?

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How do you find the point of intersection for $x + y = - 3$ $x+y= -3$ and $x + y = 3$ $x+y=3$ ?

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Answer 1 · 2015-07-08T20:21:38

From $x + y = 3 \to y = - x + 3 = 3 - x$ $x+y=3->y=-x+3=3-x$

Explanation:

Now substitute that in the other equation:
$x + y = x + (3 - x) = - 3 \to 3 = - 3$ $x+y=x+(3-x)=-3->3=-3$
This cannot be. Clearly there is no intersection.

We could have seen this, because (as we have seen before), the second equation translates to a slope-intercept form of
$y = - x + 3$ $y=-x+3$
While the first will translate to:
$y = - x - 3$ $y=-x-3$
Same slope ( $- 1$ $-1$ ), but different intercepts ( $+ 3 and - 3$ $+3and-3$ ), in other words, these are parallel lines.
Here is the graph for $y = - x + 3$ $y=-x+3$ the other one runs parallel and $6$ $6$ units below it:
graph{-x+3 [-10, 10, -5, 5]}

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How do you find the point of intersection for $x + y = - 3$ $x+y= -3$ and $x + y = 3$ $x+y=3$ ?

1 Answer

Explanation:

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How do you find the point of intersection for $x + y = - 3$ $x+y= -3$ and $x + y = 3$ $x+y=3$ ?