smallcattle
Member
i dont understand this topic.. so sort of questions can they ask??
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Locus problems (1 Viewer)
- Thread starter smallcattle
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velox
Retired
Do you mean Locus and the parabola ? I.e Parametrics (x<sup>2</sup> = 4ay)?
smallcattle
Member
Yeh, that topic, i cant find much questions on that topic in past papers, so i have a strong feeling that they might put it up this time
i just dont understand..this topic
i just dont understand..this topic
velox
Retired
Well just learn how to derive all the equations such as, the tangents to a parabola, normal to a parabola etc. After knowing the derivations, most questions are reasonably ok. Oh wait, parametrics is 3u.
So you'd be talking about the locus of circles etc...
So you'd be talking about the locus of circles etc...
Seraph
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look at teh 2002 paper
Co-ordiante geometry question (iii)
Find the co-ordinates of poitn C that lies on the y axis and is equidistiant from A and B
now imagine this graph plz lol B(1,5) and A(2,2)
now in this case essentially we aer trying to find point C , it has been made very easy for us because they have told us its on the y axis this means x is 0
so using locus we can find the poitn
the term Equidistant means essentially The distance from C to B is equal to distnace from C to A
you should draw this , C is (0,y) now our condition is then
CB = CA
very good, now that being said we use our distance formulas
((5-y)^2 + (1-0)^2)^(1/2) = ((2-y)^2 + (2-0)^2)^(1/2)
very good
now , we get rid of the square roots , by x each side by them
and just make the equation y = something
adn eventually we get our Y point and there we have point C
this is just a typical application of LOCUS
Co-ordiante geometry question (iii)
Find the co-ordinates of poitn C that lies on the y axis and is equidistiant from A and B
now imagine this graph plz lol B(1,5) and A(2,2)
now in this case essentially we aer trying to find point C , it has been made very easy for us because they have told us its on the y axis this means x is 0
so using locus we can find the poitn
the term Equidistant means essentially The distance from C to B is equal to distnace from C to A
you should draw this , C is (0,y) now our condition is then
CB = CA
very good, now that being said we use our distance formulas
((5-y)^2 + (1-0)^2)^(1/2) = ((2-y)^2 + (2-0)^2)^(1/2)
very good
now , we get rid of the square roots , by x each side by them
and just make the equation y = something
adn eventually we get our Y point and there we have point C
this is just a typical application of LOCUS
smallcattle
Member
locus of the parabola, focal length, directrix and things like that
Seraph
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?
(X-h)^2 = 4a(y-k) is your equation for a parabola that can be anywhere but in a direction where its y axis is its symmetry
(h,k) vertex
4a its positive we know its direction is upwords
HERE IS A TYPICAL QUESTION
Consider the parabola y = x^2 - 8x + 4
find its vertext
we must change it into that equation
TO DO SO WE NEED TO COMPLETE ZE SQUARE
x^2 - 8x = y -4
x^2 -8x + (-8/2)^2 = -4 + (-8/2)^2 complete ze square is just square the -b thing and divide by 2
so x^2 -8x + 16 = y - 4 + 16
x^2 - 8x + 16 = y + 12
now simplify to the (X-h)^2 = 4a(y-k)
(x-4)^2 = Now because this equation is gay on this side we cant really factorise anythign so its form is
(x-4)^2 = (y +12)
however we must find our FOCAL LENGTH
this is a positive parabola because in front of (y+12) its a 1
so 4a = 1
a = 1/4
ORU FOCAL LENGTH IS 1/4
NICE
so ... our vertex is just h.k right?
4, - 12 IS OUR VERTEX
great
OUR FOCUS is then (since its concave up) we add 1/4 TO THE Y POINT , remember this is a positive PARABOLA
so our focus co-ordiantes are (4,-11 3/4)
P.s The directrix is just The opposite direction of the focal length to the Vertex Point
so in this case.... it would be y = -12 -1/4
y = -12.25
similarly if it was -4a we would work in the opposite direction
and if it was (y-k)^2 y is dominant this means the parabola is flipped along the x axis..... manipulation thats all it is
(X-h)^2 = 4a(y-k) is your equation for a parabola that can be anywhere but in a direction where its y axis is its symmetry
(h,k) vertex
4a its positive we know its direction is upwords
HERE IS A TYPICAL QUESTION
Consider the parabola y = x^2 - 8x + 4
find its vertext
we must change it into that equation
TO DO SO WE NEED TO COMPLETE ZE SQUARE
x^2 - 8x = y -4
x^2 -8x + (-8/2)^2 = -4 + (-8/2)^2 complete ze square is just square the -b thing and divide by 2
so x^2 -8x + 16 = y - 4 + 16
x^2 - 8x + 16 = y + 12
now simplify to the (X-h)^2 = 4a(y-k)
(x-4)^2 = Now because this equation is gay on this side we cant really factorise anythign so its form is
(x-4)^2 = (y +12)
however we must find our FOCAL LENGTH
this is a positive parabola because in front of (y+12) its a 1
so 4a = 1
a = 1/4
ORU FOCAL LENGTH IS 1/4
NICE
so ... our vertex is just h.k right?
4, - 12 IS OUR VERTEX
great
OUR FOCUS is then (since its concave up) we add 1/4 TO THE Y POINT , remember this is a positive PARABOLA
so our focus co-ordiantes are (4,-11 3/4)
P.s The directrix is just The opposite direction of the focal length to the Vertex Point
so in this case.... it would be y = -12 -1/4
y = -12.25
similarly if it was -4a we would work in the opposite direction
and if it was (y-k)^2 y is dominant this means the parabola is flipped along the x axis..... manipulation thats all it is
smallcattle
Member
very nice explaination.. very understandable lol.. 
i'll rep u for that
i'll rep u for that
Seraph
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hah if i can find one
but i think the locus of the circle questions are the same principle
only you will get an equation and it will have x^2 and y^2
so you manipulate it into the circle forumla
x^2 + y^2 = r^2
or (x-h)^2 + (y-k)^2 = r^2 for a circle at any place (hah im pretty sure)
oh and you guys should know about the perpendicular locus
with these questions your condition is
GRADIENT PA x GRADIENT PB = -1
you must use the gradient formula's and manipulate it using this equation
sorry i'll try to find some questions Right after i do some practice on shit superannuation
NOTE I AM YET TO SEE THIS QUESTION IN ANY HSC PAPER , BUT KNOWING THE BOS MARKERS THEY ARE PROBABLY LOOKING AT THIS POST AND THINKING LOL OMG THAT SERAPH WHAT A N00B LETS THROW ONE IN
no seriously though , locus is not that common , but yea i guess its good not to take any chances
but i think the locus of the circle questions are the same principle
only you will get an equation and it will have x^2 and y^2
so you manipulate it into the circle forumla
x^2 + y^2 = r^2
or (x-h)^2 + (y-k)^2 = r^2 for a circle at any place (hah im pretty sure)
oh and you guys should know about the perpendicular locus
with these questions your condition is
GRADIENT PA x GRADIENT PB = -1
you must use the gradient formula's and manipulate it using this equation
sorry i'll try to find some questions Right after i do some practice on shit superannuation
NOTE I AM YET TO SEE THIS QUESTION IN ANY HSC PAPER , BUT KNOWING THE BOS MARKERS THEY ARE PROBABLY LOOKING AT THIS POST AND THINKING LOL OMG THAT SERAPH WHAT A N00B LETS THROW ONE IN
no seriously though , locus is not that common , but yea i guess its good not to take any chances
Last edited:
Binky
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Just thought i'd point out here you don't actually need to complete the square...Seraph said:
i find this way easier, so have a think about it...
ok first find the axis of symmetry with: -b/2a
then sub that y value in and get its x value and then you have your coordinates of the vertex, then just stick in in: (x-h)^2 = 4a(y-k) then you can work out what a is.