To solve the inequality x + 1 2/3 > 4, we need to isolate x.
First, we can simplify the expression 1 2/3, which is equivalent to 5/3. Therefore, the inequality becomes:
x + 5/3 > 4
Next, we can subtract 5/3 from both sides to isolate x:
x > 4 - 5/3
To combine the terms on the right side, we need a common denominator:
x > (12/3) - (5/3)
x > 7/3
Therefore, the solution to the inequality is x > 7/3.
find the solution to the inequality x+1 2/3>4.
3 answers
where would x > 7/3 appear on a number line from -10 to 10
On a number line from -10 to 10, x > 7/3 would appear to the right of 7/3.
To determine the position of 7/3 on the number line, we can divide the number line into equal parts:
-10 ............. -3 ......... 0 ......... 3 ......... 7/3 ......... 10
Since x > 7/3, all values to the right of 7/3 on the number line would satisfy the inequality. This means that x can be any value greater than 7/3.
To determine the position of 7/3 on the number line, we can divide the number line into equal parts:
-10 ............. -3 ......... 0 ......... 3 ......... 7/3 ......... 10
Since x > 7/3, all values to the right of 7/3 on the number line would satisfy the inequality. This means that x can be any value greater than 7/3.
1 answer