GIVEN:
\[y\text{ }=\text{ }3x\text{ }+\text{ }1\text{ }\ldots \text{ }\left( 1 \right)\]
\[2y\text{ }=\text{ }x\text{ }+\text{ }3\text{ }\ldots \text{ }\left( 2 \right)\]
\[y\text{ }=\text{ }mx\text{ }+\text{ }4\text{ }\ldots \text{ }\left( 3 \right)\]
Here the slants of
Line (1), \[m1\text{ }=\text{ }3\]
Line (2), \[m2\text{ }=\text{ }{\scriptscriptstyle 1\!/\!{ }_2}\]
Line (3), \[m3\text{ }=\text{ }m\]
We realize that the lines (1) and (2) are similarly disposed to line (3) which implies that the point between lines (1) and (3) rises to the point between lines (2) and (3).
On additional estimation
\[\text{ }m2\text{ }+\text{ }m\text{ }+\text{ }6\text{ }=\text{ }1\text{ }+\text{ }m\text{ }\text{ }6m2\]
So we get
\[5m2\text{ }+\text{ }5\text{ }=\text{ }0\]
Separating the condition by 5
\[m2\text{ }+\text{ }1\text{ }=\text{ }0\]
\[m\text{ }=\text{ }\surd -1\] , which isn’t genuine.
Hence, this case is beyond the realm of imagination.
On the off chance that