The problem involves finding the equation of the normal line to the curve defined by the equation y² - xy + 3 = 0 at the point (-2, 3). The discussion centers around the relationship between the slopes of the tangent and normal lines.
Participants are actively engaging with the problem, verifying calculations, and clarifying concepts related to slopes. There is a mix of attempts to derive the normal line equation and questions about the correctness of the derived forms.
There are indications of potential misunderstandings regarding the relationship between the slopes of tangent and normal lines, as well as the proper application of the point-slope form of a line. Some participants express uncertainty about the signs and calculations involved.
What you have found is the equation of the tangent line at (-2,3). You need to use the same method, but use the slope of the normal to the curve at that point. Do you know how the slopes of two mutually perpendicular lines are related to each other?mathmann said:The Attempt at a Solution
dy
__ = -6
dx
y - 3 = -6(x + 2)
6x + y +9 = 0
No, you don't.mathmann said:thanks for the help. Just wanted to verify one thing though, don't you muliply -1 by the (x + 2) making them both negative.
y - 3 = -1/6 (x + 2)
6y - 18 = -x -2
x + 6y -16 = 0