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I've been working on this conics problem for over an hour. Just by looking at it I know it's an ellipse. I just can't seem to get rid of the xy term (with the axis rotation formula) so I can pull out a clean ellipse equation to graph.
29x^2-48xy+49y^2-12√169x-8√169y=0
Here's what I have so far
tan2ϑ=48/20
cosϑ=5√26/26
sinϑ=√26/26
x=5√26/26 x’-√26/26 y’
y=√26/26 x’+ 5√26/26 y’
So after a full page of plugging in the x and y term with the x' and y' and foiling and expanding I cannot seem to get rid of the xy term. I know it's probably some little algebraic or computational mistake somewhere, but I can't seem to catch it.
29x^2-48xy+49y^2-12√169x-8√169y=0
Here's what I have so far
tan2ϑ=48/20
cosϑ=5√26/26
sinϑ=√26/26
x=5√26/26 x’-√26/26 y’
y=√26/26 x’+ 5√26/26 y’
So after a full page of plugging in the x and y term with the x' and y' and foiling and expanding I cannot seem to get rid of the xy term. I know it's probably some little algebraic or computational mistake somewhere, but I can't seem to catch it.
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