# Parameterizing two lines that intersect

Assume we have two lines

y1 = (m1)(x1) + b1
y2 = (m2)(x2) + b2

But now assume that they intersect. I am trying to re-write them in terms of each other, knowing that they intersect. I found online this:

y1 = m1 * (x1 - x0) + y0
y2 = m2 * (x2 - x0) + y0

and the intersection point is (x0, y0). Can someone show the steps to how this was derived?

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Sounds like a marvelous question for math.stackexchange.com –  Eddy Aug 19 '11 at 19:39

y1 = m1(x1) + b1 = m1(x1 - x0 + x0) + b1 = (m1)(x1 - x0) + (m1)(x0) + b1
y2 = m2(x2) + b2 = m2(x2 - x0 + x0) + b2 = (m1)(x2 - x0) + (m2)(x0) + b2

But since (x0, y0) is the point of intersection (that is, if we plug x0 into the either of the two starting equations, the result will equal y0).

y0 = (m1)(x0) + b1 = (m2)(x0) + b2

Therefore we can replace both (m1)(x0) + b1 and (m2)(x0) + b2 with y0:

y1 = (m1)(x1 - x0) + y0
y2 = (m1)(x2 - x0) + y0
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This site should help explain it for you: Slope-Intercept Form

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right, but why are the y-intercepts the same? why do two lines that intersect must have the same y-intercept? and why is that y-intercept the intersection point? –  CodeGuy Aug 19 '11 at 19:43
The y intercepts are the same because you are solving for the point of intersection. Once you find the same y's and solve the equation for x, they will also be the same. The way the equation is setup is by assuming you know the start height of the line (b), the slope (m) and a given x point. You can also solve these equations for a similar x by re-arranging the equation a little. –  Dan W Aug 19 '11 at 19:46
@CodeGuy, look at page two of that link, point-slope form. You know that the first line passes through the points (x0, y0) and (0, b1). Similarly, the second line passes through the points (x0, y0) and (0, b2). Just plug them into the formula. When in point-slope form, the value y0 is NOT the y-intercept (the height of the line where it crosses the y-axis), it's the height of the line where it crosses the x = x0 mark. –  Seth Aug 19 '11 at 19:49