Find the range of value of x for which 13>3x-23 where all the members are integers
3 x - 23 < 13
3 x < 36
x < 12
All integers less than 12, including negative integers and zero. The largest number in the range would be 11.
To find the range of values for x that satisfy the inequality 13 > 3x - 23, we can follow these steps:
Step 1: Add 23 to both sides of the inequality:
13 + 23 > 3x - 23 + 23
36 > 3x
Step 2: Divide both sides of the inequality by 3. Since we are dealing with integers, we need to find the highest and lowest possible integer values that x can take:
36/3 > 3x/3
12 > x
Therefore, the range of integer values for x that satisfy the inequality is x ≤ 12. This means that x can take any integer value less than or equal to 12.