The sum of 11 and three-fourths of a number is less than 112. What are all the possible values of the number? Write an inequality that could be used to solve this problem. Use the letter x as the variable, and write the inequality so that the x term comes first. Where necessary, write numbers as fractions (rather than decimals). Do not solve the inequality. Note: You will find the option to add a > , < , ≥ , or ≤ symbol in the Comparison (<) keyboard.

Question

The sum of 11 and three-fourths of a number is less than 112. What are all the possible values of the number? Write an inequality that could be used to solve this problem. Use the letter x as the variable, and write the inequality so that the x term comes first. Where necessary, write numbers as fractions (rather than decimals). Do not solve the inequality. Note: You will find the option to add a > , < , ≥ , or ≤ symbol in the Comparison (<) keyboard.

Answer 1

Let x be the number.

The inequality that could be used to solve this problem is:

$\frac{3}{4}x + 11 < 112$

Answer 2

Apologies for the oversight. Let's try again.

The inequality that could be used to solve this problem is:

$x + \frac{3}{4}x < 112$

This inequality indicates that the sum of the number x and three-fourths of the number is less than 112.