2+3>=or2t+9>11
If the equations or inequalities have the same slope, they have no solution or infinite solutions. If the equations/inequalities have different slopes, the system has only one solution.
It makes it allot less confusing. But, that is just my opinion.
mountaintop
the solution for the inequality 4x + 2 - 6x < -1 was x < 3/2
Break the question down into two separate equations: Y >= -3 and x >= 6. The graph for the first equation looks like a horizontal line going through point (0,-3) with all of the space above the equation shaded in. The line is a solid line in the solution of equation #1. For equation #2 (x>=6) the graph would look like a solid vertical line that goes through point (6,0). Everything to the right of the line would be shaded in. The system of inequalities would be everything that includes both of these shaded areas or the area in which these two inequalities intercept. So everything shaded that is in both of these inequality equations colors would be the answer - including any point that may be on either line.
Compound inequalities is when there is two inequality signs. You will regularly graph compound inequalities on a number line.
two inequalities joined by and or or. Drew Saddler was here
Compound inequalities are inequalities that have more than one sign, for example, 5
A pair of inequalities joined by "and" is called a conjunction, while a pair of inequalities joined by "or" is called a disjunction.
An inequality with "and" is true if BOTH inequalities are true. Inequality with "or" is true if ONE of the inequalities are true.
compound inequality :)
Yes
two inequalities joined by and or or. Drew Saddler was here
It means that both inequalities must be satisfied.
The name for two inequalities written as one inequality is a "compound inequality." This format expresses relationships involving two conditions simultaneously, often using "and" or "or" to connect them. For example, the compound inequality (3 < x < 7) combines two inequalities, (3 < x) and (x < 7).
Compound inequalities are used in real life to describe ranges of values that satisfy multiple conditions simultaneously. For example, a restaurant may require customers to be aged between 18-65 years old and have a minimum income of $30,000 to qualify for a discount. In this case, compound inequalities can help determine who meets both criteria.
represent x > 6 and x <=18 enter the compound inequality without using and