Let's bring both equations to slope-intercept form. Then we can think about the slopes and the yyy-intercepts of the lines represented by each equation.
The first equation y = -3x+9y=−3x+9y, equals, minus, 3, x, plus, 9 is already in slope-intercept form. The slope-intercept form of the second equation 3y=-9x+93y=−9x+93, y, equals, minus, 9, x, plus, 9 is y=-3x+3y=−3x+3y, equals, minus, 3, x, plus, 3.
Hint #22 / 3
The first equation is y = -3x+9y=−3x+9y, equals, minus, 3, x, plus, 9, so the slope of its line is -3−3minus, 3 and the yyy-intercept is (0,9)(0,9)left parenthesis, 0, comma, 9, right parenthesis.
The second equation is y = -3x+3y=−3x+3y, equals, minus, 3, x, plus, 3, so the slope of its line is -3−3minus, 3 and the yyy-intercept is (0,3)(0,3)left parenthesis, 0, comma, 3, right parenthesis.
Since both lines have the same slopes but different yyy-intercepts, they are distinct parallel lines.
Hint #33 / 3
Answer:
Since distinct parallel lines don't intersect, we conclude that the system has no solutions.
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