In a rectangular coordinate plane, which quadrant, if any, contains no point (x,y) such that it satisfies the inequality 2x-3y<-6
Answers
Answer:
4th quadrant
Step-by-step explanation:
Given : inequality 2x-3y<-6
To find : which quadrant, if any, contains no point (x,y) satisfying inequality
Solution:
2x - 3y < - 6
at x = 0
=> - 3y < - 6
=> y > 2
x = 1 => y > 8/3 ( hence 1st Quadrant - point lies)
x = - 1 => y > 4/3
x = - 3 y > 0 ( hence 2nd Quadrant - point lies)
x = - 6
=> y > - 2 ( hence 3rd Quadrant - point lies)
but if y < 0
then x < 0 ( hence 4th Quadrant not possible)
where x is + Ve & y is - ve
4th Quadrant does not contain any points
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