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Locus/Parabola (1 Viewer)
- Thread starter -pari-
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Let the parabola be x2=4ay.
The x-coordinate at any part of the parabola corresponds to half the diameter (ie the radius)
.'. When diameter=4, x=2 and depth (y)=0.4 (or 2/5)
Hence substituting into parabola x2=4ay,
22=4a(2/5)
a=5/2
.'. equation of parabola is x2= 4.(5/2).y =10y
When diameter=3.5 (or 7/2) , ie when radius (x) = 7/4,
10y=(7/4)2
y=0.3
.'. depth is 0.3 m when diameter is 3.5 m.
The x-coordinate at any part of the parabola corresponds to half the diameter (ie the radius)
.'. When diameter=4, x=2 and depth (y)=0.4 (or 2/5)
Hence substituting into parabola x2=4ay,
22=4a(2/5)
a=5/2
.'. equation of parabola is x2= 4.(5/2).y =10y
When diameter=3.5 (or 7/2) , ie when radius (x) = 7/4,
10y=(7/4)2
y=0.3
.'. depth is 0.3 m when diameter is 3.5 m.
Last edited:
Dio-Rama
Member
i dont
y does a=5/2?
y not 2/5?
y does a=5/2?
y not 2/5?
airie
airie <3 avatars :)
Because a*2/5=1, after subbing in the x and y values into the general formula for a parabola. Divide both sides by 2/5 you get a=5/2.
-pari-
Active Member
*not related to the above question but still on locus/parabola: didn't want to bother ppl with a whole new thread just on this:
do 2u maths students need to know latus rectum? i've heard they don't? can anyone clarify this for me?
do 2u maths students need to know latus rectum? i've heard they don't? can anyone clarify this for me?
SoulSearcher
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Didn't even know what a latus rectum was until a couple of weeks ago 
but I'm not sure if you need it for 2 unit, you might want to check the syllabus there.
but I'm not sure if you need it for 2 unit, you might want to check the syllabus there.-pari-
Active Member
good idea
also ..this was really stupid of me but i didn't check the answer when i read riviet's reply
redoing the question now...the actual answer is 0.3m :S
i think x^2 = 4ay
is only used when the vertex is at the origin.
also ..this was really stupid of me but i didn't check the answer when i read riviet's reply
redoing the question now...the actual answer is 0.3m :S
i think x^2 = 4ay
is only used when the vertex is at the origin.
Last edited:
airie
airie <3 avatars :)
^Actually, when the vertex of a parabola is not at the origin, you could always rotate and translate it until the vertex is
In this case the value of a as Riviet has found is correct. He just made a mistake when he subbed in x=7/4 into the formula. It should have been (7/4)2=10y, therefore y=49/160 which is 0.3 to 1 decimal place
In this case the value of a as Riviet has found is correct. He just made a mistake when he subbed in x=7/4 into the formula. It should have been (7/4)2=10y, therefore y=49/160 which is 0.3 to 1 decimal place
-pari-
Active Member
awesome. i knew how to do it when i attempted the same question this time round !
um, i have some more questions though, and any help would be really appreciated....
------
Q6 (its part (e) that i couldn't do, but here's all the info...)
> Let R(1/5 , -2) be a point on the parabola y^2 = 20x.
>
> from part (a) we find out the equation of the focal chord is:
> 5x-12y-25 = 0.
>
> (b) the co oridnates of Q where the focal chord cuts the directrix
> is (-5,
> -4 1/6)
>
> (c) the area of the triangle OFQ where O is the origin, F is the
> focus is
> 10 5/12 units squared.
>
> (d) te perpendicular distance from the chord to the point P (-1,
> -7) is 4
> 2/13 units.
>
> (e)! the bit i couldn't get...
> Hence find the area of triangle PQR. (answer 11.7 units^2
-------
Q8) find the equation of the parabola with axis parallel to the y
> axis and
> passing through points A(0, -2) B(1, 0) C ( 3, -8)
------
3a) find the equation of parabola with axis parallel to yaxis passing
> through a(0,3) b(1, 0 ) c (2, -1)
!um, i have some more questions though, and any help would be really appreciated....
------
Q6 (its part (e) that i couldn't do, but here's all the info...)
> Let R(1/5 , -2) be a point on the parabola y^2 = 20x.
>
> from part (a) we find out the equation of the focal chord is:
> 5x-12y-25 = 0.
>
> (b) the co oridnates of Q where the focal chord cuts the directrix
> is (-5,
> -4 1/6)
>
> (c) the area of the triangle OFQ where O is the origin, F is the
> focus is
> 10 5/12 units squared.
>
> (d) te perpendicular distance from the chord to the point P (-1,
> -7) is 4
> 2/13 units.
>
> (e)! the bit i couldn't get...
> Hence find the area of triangle PQR. (answer 11.7 units^2
-------
Q8) find the equation of the parabola with axis parallel to the y
> axis and
> passing through points A(0, -2) B(1, 0) C ( 3, -8)
------
3a) find the equation of parabola with axis parallel to yaxis passing
> through a(0,3) b(1, 0 ) c (2, -1)
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(e) Area of triangle = 1/2 x (base) x (perpendicular height)
= 1/2 x (distance from P to Q) x (perpendicular distance from the chord to the point R)
You have the perpendicular distance found in (d) and just need to apply the distance formula for P and Q.
= 1/2 x (distance from P to Q) x (perpendicular distance from the chord to the point R)
You have the perpendicular distance found in (d) and just need to apply the distance formula for P and Q.
airie
airie <3 avatars :)
The most straightforward solution for both, sub all three points into the general formula (x-h)2=4a(y-k) and solve simultaneously for a, h, k-pari- said:
really sorry to be a pest and take over this thread but i didnt see the point in clogging up the forum with yet another locus question.
Find the expression for the distance PA is A is the point (-3,4) and P is any point (x,y).
show that the locus of the point P which moves so that the distance PM from the axis is equal to its distance PA from the point (-3,4) is 8y=x^2+6x+25
i am cluless how to go about this trying to work is out with the equation form the line. also baffled by this Q; find the focus and directrix of y=-1/2x^2
y=-1/2x^2
hence x^2=-2y
i am confused about this step and how is manages to become -2y... the rest is self explanitory.
if i could get an answer asap it would be much appreciated.
ps. sorry if i have not conducted myself in the proper manner. im new to the board and just getting my wits about me.
Find the expression for the distance PA is A is the point (-3,4) and P is any point (x,y).
show that the locus of the point P which moves so that the distance PM from the axis is equal to its distance PA from the point (-3,4) is 8y=x^2+6x+25
i am cluless how to go about this trying to work is out with the equation form the line. also baffled by this Q; find the focus and directrix of y=-1/2x^2
y=-1/2x^2
hence x^2=-2y
i am confused about this step and how is manages to become -2y... the rest is self explanitory.
if i could get an answer asap it would be much appreciated.
ps. sorry if i have not conducted myself in the proper manner. im new to the board and just getting my wits about me.
SoulSearcher
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- Oct 13, 2005
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Multiply y = -x2/2 by -2, to get -2y = x2
-pari-
Active Member
Find the expression for the distance PA is A is the point (-3,4) and P is any point (x,y).
show that the locus of the point P which moves so that the distance PM from the axis is equal to its distance PA from the point (-3,4) is 8y=x^2+6x+25
which axis? x or y?
show that the locus of the point P which moves so that the distance PM from the axis is equal to its distance PA from the point (-3,4) is 8y=x^2+6x+25
which axis? x or y?
It's the x-axis (don't ask me why, I just know-pari- said:
).So the distance PA = sqrt{(x+3)2 + (y-4)2}. Now the distance from the x-axis to P is just y (we are making a big assumption that it's the perpendicular distance from the axis).
So distance PA = y
sqrt{(x+3)2 + (y-4)2} = y
Squaring both sides and expanding,
x2 + 6x + 9 + y2 -8y + 16 = y2
.'. 8y = x2 + 6x + 25