Prove that the area of the triangle whose vertices are `(t ,t-2),(t+2,t+2),` and `(t+3,t)` is independent of `tdot`

To prove that the area of the triangle with vertices \((t, t-2)\), \((t+2, t+2)\), and \((t+3, t)\) is independent of \(t\), we will use the formula for the area of a triangle given its vertices. ### Step-by-Step Solution: 1. **Identify the vertices**: - Let \(A = (t, t-2)\) - Let \(B = (t+2, t+2)\) - Let \(C = (t+3, t)\) ...