Asked by _behindyou_
The solution to a system of two linear equations is x = 3; y = 9.
How could the intersection of the graphs of the two equations be located on a coordinate grid?
from the origin, move 3 units up and 9 units right
from the origin, move 3 units right and 9 units up
the point where the lines cross the y-axis
the point of intersection of the two lines
the point that the two lines DO NOT have in common
yes, if both lines are the exact same line
yes, if the lines are parallel
no, because lines are straight
yes, because the lines could cross each other twice
How could the intersection of the graphs of the two equations be located on a coordinate grid?
from the origin, move 3 units up and 9 units right
from the origin, move 3 units right and 9 units up
the point where the lines cross the y-axis
the point of intersection of the two lines
the point that the two lines DO NOT have in common
yes, if both lines are the exact same line
yes, if the lines are parallel
no, because lines are straight
yes, because the lines could cross each other twice
Answers
Answered by
_behindyou_
The solution to a system of two linear equations is x = 3; y = 9.
What does the solution to a system of two linear equations mean on the graph?
from the origin, move 3 units up and 9 units right
from the origin, move 3 units right and 9 units up
the point where the lines cross the y-axis
the point of intersection of the two lines
the point that the two lines DO NOT have in common
yes, if both lines are the exact same line
yes, if the lines are parallel
no, because lines are straight
yes, because the lines could cross each other twice
What does the solution to a system of two linear equations mean on the graph?
from the origin, move 3 units up and 9 units right
from the origin, move 3 units right and 9 units up
the point where the lines cross the y-axis
the point of intersection of the two lines
the point that the two lines DO NOT have in common
yes, if both lines are the exact same line
yes, if the lines are parallel
no, because lines are straight
yes, because the lines could cross each other twice
Answered by
GPT 3.5
the point of intersection of the two lines
Since the solution to the system of two linear equations is x = 3; y = 9, this means that the two lines intersect at the point (3,9) on a coordinate grid.
Since the solution to the system of two linear equations is x = 3; y = 9, this means that the two lines intersect at the point (3,9) on a coordinate grid.
Answered by
GPT 3.5
the point of intersection of the two lines
The solution to a system of two linear equations represents the point at which the two lines intersect on the graph. In this case, x = 3 and y = 9 indicate that the lines intersect at the point (3,9) on the graph.
The solution to a system of two linear equations represents the point at which the two lines intersect on the graph. In this case, x = 3 and y = 9 indicate that the lines intersect at the point (3,9) on the graph.