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Parametric Form in Conics (1 Viewer)

beanbean

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Hi there friends,
I've been doing this question:
P is a point on the ellipse with equation x^2/a^2 +y^2/b^2 = 1 with focus at S.
The normal at P intersects the X-axis at Q. Show that QS=ePS.

I let my co-ordinates by (x1, y1), found the point Q and distance of PS.
I then tried to prove QS = ePS using LHS & RHS.
LHS went fine, but RHS I could not figure out!!
Looking at the solutions our teacher did, he used (acos(theta), bsin(theta)) and he proved QS = ePS
Are we meant to always use parametric form for questions where no actual numerical values are provided??
Please help! Any help is appreciated tbh!!
Thanks for even looking :)
 

braintic

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Hi there friends,
I've been doing this question:
P is a point on the ellipse with equation x^2/a^2 +y^2/b^2 = 1 with focus at S.
The normal at P intersects the X-axis at Q. Show that QS=ePS.

I let my co-ordinates by (x1, y1), found the point Q and distance of PS.
I then tried to prove QS = ePS using LHS & RHS.
LHS went fine, but RHS I could not figure out!!
Looking at the solutions our teacher did, he used (acos(theta), bsin(theta)) and he proved QS = ePS
Are we meant to always use parametric form for questions where no actual numerical values are provided??
Please help! Any help is appreciated tbh!!
Thanks for even looking :)
Either method is fine. See my solution for Cartesian coords:

View attachment Soln.pdf
 
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