Since in the question, there are no ordered pairs given so you can consider the below explanation to check which ordered pairs satisfies the inequality 3x-4y>12
Step-by-step explanation:
We need to identify which ordered pair(x,y) satisfies the inequality 3x-4y>12
The ordered pair (x,y) which satisfies the inequality will be the values of x and y that satisfies the inequality given 3x-4y>12
So, if x= 2 and y = 2 then the inequality will be:
3x-4y>12
3(2)-4(2)>12
6-8>12
-2>12 is false because -2 is not greater than 12
So, ordered pair (2,2) doesn't satisfy the inequality 3x-4y>12
Now if x = 10 and y = 2 then the inequality will be:
3x-4y>12
3(10)-4(2)>12
30-8>12
22>12 is true because 22 is greater than 12.
So, ordered pair (10,2) satisfies the inequality 3x-4y>12
Since in the question, there are no ordered pairs given so you can consider the above explanation to check which ordered pairs satisfies the inequality 3x-4y>12
Keywords: Solving inequalities
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