[All Steps] Define a binary relation T from R to R as follows: for all (x, y) ∈ R * R, x T y => y>x+1 Is (1,0) ∈ T ? Is (0,1) ∈ T ? Is (-2,5)
Question: Define a binary relation \(T\) from \(\mathbb{R}\) to \(\mathbb{R}\) as follows: for all \((x, y) \in \mathbb{R} \times \mathbb{R}\), \(x T y \Leftrightarrow y>x+1\)
- Is \((1,0) \in T\) ? Is \((0,1) \in T ?\) Is \((-2,5) \in T ?\) Is \((-3,-4) \in T ?\)
- Sketch the graph of \(T\) in the Cartesian plane.
Deliverable: Word Document 
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