A compound inequality is a conjuction of two or more inequalities. The set of solutions for a compound inequality are the values which make all of the inequalities true.
Write a compound inequality to represent the solution set shown on the number line.
Find the solution set of the compound inequality x \geq -5 and x < 3 using set-builder notation and plot the solution on a number line.
The formula for converting temperatures from Celsius to Fahrenheit is: F = \dfrac{9}{5} C+32
During a recent year, the average temperatures in Tampa, Florida ranged from 59 \degree to 95 \degree Fahrenheit.
Write a compound inequality to solve for the corresponding range of values of C, the temperature in Florida in degrees Celsius.
Consider the following pair of inequalities:\begin{aligned} \text{Inequality 1: }\, \, & 1.2x +0.2 \leq 11.6 \\ \text{Inequality 2: }\,\, & 6 - 3.5x \lt 48 \end{aligned}
State the solution to the compound inequality that is Inequality 1 OR Inequality 2.
Plot the solution set on a number line.
Determine whether x=7.5 is a valid solution to the compound inequality.