Lesson 11

Find each of the following and explain your reasoning:

1. The length of segment \(BE\).
2. The coordinates of \(E\).

Line \(j\) is shown in the coordinate plane.

 

Here are the points \(A\), \(C\), and \(E\) on the same line. Triangles \(ABC\) and \(ADE\) are slope triangles for the line so we know they are similar triangles. Let’s use their similarity to better understand the relationship between \(x\) and \(y\), which make up the coordinates of point \(E\).

The slope for triangle \(ABC\) is \(\frac{2}{1}\) since the vertical side has length 2 and the horizontal side has length 1. The slope we find for triangle \(ADE\) is \(\frac{y}{x}\) because the vertical side has length \(y\) and the horizontal side has length \(x\). These two slopes must be equal since they are from slope triangles for the same line, and so: \(\frac{2}{1} = \frac{y}{x}\).

Since \(\frac{2}{1} = 2\) this means that the value of \(y\) is twice the value of \(x\), or that \(y= 2x\). This equation is true for any point \((x,y)\) on the line!

Here are two different slope triangles. We can use the same reasoning to describe the relationship between \(x\) and \(y\) for this point \(E\).

The slope for triangle \(ABC\) is \(\frac{2}{1}\) since the vertical side has length 2 and the horizontal side has length 1. For triangle \(ADE\), the horizontal side has length \(x\). The vertical side has length \(y-1\) because the distance from \((x,y)\) to the \(x\)-axis is \(y\) but the vertical side of the triangle stops 1 unit short of the \(x\)-axis. So the slope we find for triangle \(ADE\) is \(\frac{y-1}{x}\). The slopes for the two slope triangles are equal, meaning: \(\displaystyle \frac{2}{1} = \frac{y-1}{x}\)

Since \(y-1\) is twice \(x\), another way to write this equation is \(y-1 = 2x\). This equation is true for any point \((x,y)\) on the line!