(i) Consider the line x+y=8. We observe that the shaded region and origin lie on the same side of this line and (0,0) satisfies x+y≤8.
Therefore, x+y≤8 is the linear inequality corresponding to the line x+y=8.
(ii) Consider x+y=4. We observe that shaded region and origin are on the opposite side of this line and (0,0) satisfies x+y≤4.
Therefore, we must have x+y≥4 as linear inequalities corresponding to the line x+y=4
(iii) Shaded portion lie below the line y=5. So, y≤5 is the linear inequality corresponding to y=5.
(iv) Shaded portion lie on the left side of the line x=5, So, x≤5 is the linear inequality corresponding to x=5
(v) Also, the shaded region lies in the first quadrant only. Therefore, x≥0,y≥0.
In view of (i), (ii), (iii), (iv) and (v) above the linear inequalities corresponding to the given solutions are: x+y≤8,x+y≥4,y≤5,x≤5,x≥0 and y≥0
