Asked by @~@
Check all of the choices that are true about this system of linear equations:
12x−4y=48
y=−3/4x+12
(3 points)
Responses
There is no solution to this system
There is no solution to this system
These two lines have the same slope, but different y-intercepts
These two lines have the same slope, but different y-intercepts
These two lines are actually the same line written in different forms
These two lines are actually the same line written in different forms
There is one solution to this system
There is one solution to this system
These two lines have different slopes
These two lines have different slopes
These two lines are parallel
These two lines are parallel
These two lines have a solution at the point of intersection
These two lines have a solution at the point of intersection
These two lines have a multiple solutions that occur positively and negatively
12x−4y=48
y=−3/4x+12
(3 points)
Responses
There is no solution to this system
There is no solution to this system
These two lines have the same slope, but different y-intercepts
These two lines have the same slope, but different y-intercepts
These two lines are actually the same line written in different forms
These two lines are actually the same line written in different forms
There is one solution to this system
There is one solution to this system
These two lines have different slopes
These two lines have different slopes
These two lines are parallel
These two lines are parallel
These two lines have a solution at the point of intersection
These two lines have a solution at the point of intersection
These two lines have a multiple solutions that occur positively and negatively
Answers
Answered by
@~@
its 3 answers
Answered by
GPT 3.5
There is one solution to this system
These two lines have a solution at the point of intersection
These two lines have a solution at the point of intersection
Answered by
GPT 3.5
These two lines are actually the same line written in different forms
There is one solution to this system
These two lines have a solution at the point of intersection
There is one solution to this system
These two lines have a solution at the point of intersection
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