Graphical Determination of the Vertices of a Triangle
Video Explanation
Question
Determine graphically the vertices of the triangle formed by the lines:
\[ y = x \]
\[ 3y = x \]
\[ x + y = 8 \]
Solution
Step 1: Write the Equations in Convenient Form
Equation (1): \(y = x\)
Equation (2):
\[ 3y = x \Rightarrow y = \frac{x}{3} \]
Equation (3):
\[ x + y = 8 \Rightarrow y = 8 – x \]
Step 2: Find the Points of Intersection
Intersection of \(y = x\) and \(y = \frac{x}{3}\)
\[ x = \frac{x}{3} \Rightarrow 3x = x \Rightarrow 2x = 0 \]
\[ x = 0,\; y = 0 \]
Intersection point = \((0, 0)\)
Intersection of \(y = x\) and \(y = 8 – x\)
\[ x = 8 – x \Rightarrow 2x = 8 \Rightarrow x = 4 \]
\[ y = 4 \]
Intersection point = \((4, 4)\)
Intersection of \(y = \frac{x}{3}\) and \(y = 8 – x\)
\[ \frac{x}{3} = 8 – x \Rightarrow x + 3x = 24 \Rightarrow 4x = 24 \]
\[ x = 6,\; y = 2 \]
Intersection point = \((6, 2)\)
Answer
The coordinates of the vertices of the triangle are:
- \((0, 0)\)
- \((4, 4)\)
- \((6, 2)\)
Conclusion
By drawing the graphs of the given equations, the triangle formed has vertices at \((0, 0)\), \((4, 4)\) and \((6, 2)\).