Which of the following illustrates the solution of $\left( \frac{3x+4}{2} \right)<x+3$ 

Which of the following number lines illustrates the solution of the inequality $4\le \tfrac{1}{3}(2x-1)<5$?

The shaded portion in the diagram is the solution

Solve the inequality  $3(x+1)\le 5(x+2)+15$

Illustrated the inequality $-1<3x+5<14$ on a number line

Solve the inequality: $-\frac{m}{2}-\frac{5}{4}\le \frac{5m}{12}-\frac{7}{6}$

Represent the inequality $-7<4x+9\le 13$ on a number line

Given that x > y and 3 < y, which of the following is/are true?

I y > 3

II. x < 3

III. x > y > 3

Which of the following number lines represents the solution to the inequality: $-9\le \tfrac{2}{3}x-7<5$

Which of the following lines represents the solution of the inequality $7x<9x-4$?