An inequality has no magnitude. A number can be greater than or equal to -5, but not an inequality.
The quotient of a number and 3 decreased by 5 is almost 10". Match the statement with the inequality. 2/3-5 greater than equal to 10 3x-5 less than equal to 10 x/3 -5 less than equal to 10 3x-5 greater than 10
This is an Inequality Statement.Example : 5 < x : x > 10 : x ≠ -3
Equal to
It is a linear inequality in one variable, a.
Solve the inequality: 75d ÷ 5 > d + 5 → 15d > d + 5 → 14d > 5 → d > 5/14 So any value of d greater than five fourteenths is a solution Thus any value less than or equal to five fourteenths (5/14) is a solution to the question as asked.
"x3" is not an inequality. An inequality will have one of the following signs: less-than, less-than-or-equal, greater-than, greater-than-or-equal. for example: 3x - 5 < 15
It means that two expressions are not equal, as in a # b (Using "#" for inequality). A statement that includes "less than", "less than or equal", "greater than", or "greater than or equal", can also be considered an inequality, for example, | x | < 5
f+5 greater than or equal to 31
X >= -5
First of all, that's not an inequality. Inequalities have a a less than, equal to, greater than, greater than or equal to, or less then of equal to. But any way, the solution would be this: 3t + 5(-4) 3t+(-20) There you go, hope you liked it!
x+7 is greater than or equal to 2
The inequality that fits this condition is that X is greater than 1.
9>y≥5
Any inequality will work - for example, 5 is greater than 3 (5 > 3).
In an inequality, "at least" signifies that a certain value must be greater than or equal to a specified number. For example, if an inequality states that ( x \geq 5 ), it means that ( x ) can be any value that is 5 or greater. This term establishes a lower boundary for the values that satisfy the inequality.
A mathematical sentence that compares two unequal expressions is an inequality. For example, (3x + 5 < 20) states that the expression (3x + 5) is less than 20. In this case, the two expressions (3x + 5) and 20 are not equal, and the inequality conveys their relationship. Other forms of inequalities include greater than ((>)), less than or equal to ((\leq)), and greater than or equal to ((\geq)).
It is an inequality than can be solved for p: 5 ≥ p - 3 → p - 3 ≤ 5 → p ≤ 8 So any value less than, or equal to, 8 will do for p.