Write a compound inequality that represents the following phrase. Graph the solutions.
all real numbers that are between -1 and 2
Write a compound inequality that represents the phrase. Choose the correct answer below.
A. -1 < n <= 2 B. -1 <= n < 2
***C. -1 < n < 2 D. -1 <= n <= 2
Graph the solutions. Choose the correct graph below.
The correct compound inequality that represents the phrase "all real numbers that are between -1 and 2" is C. -1 < n < 2.
The correct graph for the solutions would be an open circle at -1 on the number line, followed by a shaded area between -1 and 2, and finally an open circle at 2.
The compound inequality that represents the phrase "all real numbers that are between -1 and 2" is **C. -1 < n < 2**.
The correct graph for this compound inequality is a shaded line segment on the number line, starting from -1 and ending at 2, with open circles at both -1 and 2 to indicate that the endpoints are not included in the solution set.
To create a compound inequality that represents the phrase "all real numbers that are between -1 and 2," we need to use the symbols for inequalities and combine them properly.
Since we want the numbers between -1 and 2, we need to use the symbols for strict inequalities, which are "<" and ">."
The correct compound inequality is therefore C. -1 < n < 2.
To graph the solutions, we can plot the numbers on a number line. We'll mark -1 and 2 with open circles to indicate that they are not included in the solutions. Then, we'll shade the region between -1 and 2 to represent all real numbers between -1 and 2.
The correct graph is therefore the one that shows a shaded region between -1 and 2 on the number line.