Graphical Solution of Linear Inequalities in Two Variable

In the following questions, the symbol $@, \copyright , \$, \%$ and $\#$ are used with the following meaning as illustrated below:
$\mathrm{A}\$\mathrm{B}$ means $\mathrm{A}$ is not smaller than $\mathrm{B}$.
$\mathrm{A}\#\mathrm{B}$ means $\mathrm{A}$ is not greater than $\mathrm{B}$.
$\mathrm{A}@\mathrm{B}$ means $\mathrm{A}$ is neither smaller than nor equal to $\mathrm{B}$.
$\mathrm{A}\copyright \mathrm{B}$ means $\mathrm{A}$ is neither smaller than nor greater than $\mathrm{B}$.
$\mathrm{A}\%\mathrm{B}$ means $\mathrm{A}$ is neither greater than nor equal to $\mathrm{B}$.
Now in each of the following questions assuming the given statement to be true, find which of the three conclusions I, II and III have given below them is/are definitely true and give your answer accordingly.

Statements:
$\mathrm{H}\%\mathrm{J}, \mathrm{J}\copyright \mathrm{N}, \mathrm{N}@\mathrm{R}$
Conclusions:
I. $\mathrm{R}\%\mathrm{J}$
II. $\mathrm{H}@\mathrm{J}$
III. $\mathrm{N}@\mathrm{H}$

The solution set of the inequation $2x-y\ge 1$ is

Inequation $y-x\le 0$ represents

Solve graphically:

$8x+3y\le 100$

$x\ge 0$

$y\ge 0$.

Solve $3x+2y>6$ graphically.

Write the inequality for the point lies in first quadrant.

Solve the $x-y\ge 1$ inequalities by graphical method:

Solve the inequalities $3x-2y\le x+y-8$ by graphical method:

Solve the inequalities $\left|x\right|\le 3$  by graphical method:

Show the solution set of the inequalities $2x+3y\le 6$, graphically.

Show the solution set of the inequalities $y\le -3$, graphically.

Show the solution set of $x\ge 2$ inequalities, graphically.

Graphically show the solution set of the following inequality $x-2y<0$

The point that satisfies the inequality $x+y-2>8$ is ______

The solution set of the inequation $3x+2y>3$ is

Write the region for $x\le 0$ and $y\le 0$.

Write the region for $x\ge 0$ and $y\ge 0$.

Shade the solution set of inequality $2x+3y\ge 3$.

Shade the solution set of inequality $\left|x\right|\le 3$.

For line corresponding to inequality $y-3\le 0$, which of the following statement is true?