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Locus in conics (1 Viewer)
- Thread starter sonic1988
- Start date
elseany
Member
unless im missing something this question is pretty stupid... ><
were given a line ab, but it has no bounaries, this line can exist anywhere and then theres a point on this line which cuts it in the ratio 1:2. We're told to find the locus of this line that has no boundaries. The question is stupid, the locus is a null function (or a full function? :S)
What i suspect the question means is let a and b be points on the co-ordinate axis, which in that case would be a pretty standard question;
After using similair triangles to find values for the sides, just sub into pythagoras:
y^2 + (xb/a)^2 = b^2
rearrange to give;
x^2/a^2 + y^2/b^2 = 1
did anyone else think of this after looking at that question or am i way off? (im most probably wayyy off!)
were given a line ab, but it has no bounaries, this line can exist anywhere and then theres a point on this line which cuts it in the ratio 1:2. We're told to find the locus of this line that has no boundaries. The question is stupid, the locus is a null function (or a full function? :S)
What i suspect the question means is let a and b be points on the co-ordinate axis, which in that case would be a pretty standard question;
After using similair triangles to find values for the sides, just sub into pythagoras:
y^2 + (xb/a)^2 = b^2
rearrange to give;
x^2/a^2 + y^2/b^2 = 1
did anyone else think of this after looking at that question or am i way off? (im most probably wayyy off!)
elseany
Member
its actually a circle...
if you can be bothered theres a way to test it, if you still have your whiteboard from year 12 (if you had one...) then whip it out and sticky tape a pen half way down a ruler and then move the ruler along the edges of your whiteboard.
if you can be bothered theres a way to test it, if you still have your whiteboard from year 12 (if you had one...) then whip it out and sticky tape a pen half way down a ruler and then move the ruler along the edges of your whiteboard.
elseany
Member
lmao <3 3unitz ^_^
haque
Member
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- HSC
- 2006
For these q sonic-use polar coordinates-since p divides it in that ratio, we have AP=2 and PB=4 if @ is the acute angle this line makes with the x axis then we represent the x cordinate of p as x=2cos@ and y=4sin@ using sin^2@ +cos^2@=1 u get x squared on 4 plus y squared on 16=1. If it was the mdipoint of the line then the locus would be a CIRCLE, with x=3cos@ and y=3cos@ in the polar coordinate form. 3unitz is correct.