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Parametrics - Locus (1 Viewer)

nrlwinner

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Hi. I'm not sure how to answer questions involving midpoints where multiple parameters are used.

Eg. Locus of the midpoint of P and Q on x^2 = 4ay where the x-coordinate differ by 2a
 

shaon0

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Hi. I'm not sure how to answer questions involving midpoints where multiple parameters are used.

Eg. Locus of the midpoint of P and Q on x^2 = 4ay where the x-coordinate differ by 2a
P(2ap,ap^2) and Q(2ap-2a,aq^2) ie. 2aq=2ap-2a => q=p-1 => q=(x-a)/2a
Midpt: (2ap-a,a/2(p^2+q^2))

x=2ap-a
x+a=2ap
p=(x+a)/2a ...sub into y equ

y=a/2(p^2+q^2)
y=(a/2)((x+a)^2/4a^2+((x-a)/4a^2))
y=(1/8a)((x+a)^2+(x-a)^2)
y=(1/4a)(x^2+a^2)
x^2=4ay-a^2
 

ninetypercent

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i h8 parametrics. dont get it a bit. anyone got tips?
- remember the definition of the parabola - it may come in handy
- learn to eliminate parameters to form a relationship between x and y
- keep bashing the algebra
- draw a diagram!
- remember formulas such as midpoint formula
 

nrlwinner

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Thanks I got it now. Also, I've been stuck on this one. I know the co-ordinates are right



Can someone help me turn that into a locus equation. I know I have to let the x-coordinate equal x and then make the subject p, then sub it into y, but is this algebra possible?
 

untouchablecuz

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Thanks I got it now. Also, I've been stuck on this one. I know the co-ordinates are right



Can someone help me turn that into a locus equation. I know I have to let the x-coordinate equal x and then make the subject p, then sub it into y, but is this algebra possible?
 

nrlwinner

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Thanks. Can someone help me finish this one off as well.

It's a question that the ends of the normals of a focal chord meet at R. Find the locus of R.

I've got the coordinates to be



Can someone check if that's right and how I can finish the question off.
 

jet

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Ok, heres how you go from there. (I didn't check your working up to there. Assume it's correct)

The tiny bit of information that you might have missed is that they lie on a focal chord.

Substituting the focus into the equation of a chord gives you the condition that pq = -1.

Now, you complete the square.

We know that y = a(p^2 + q^2 + 1)
= a[(p^2 - pq + q^2) + pq + 1]
= a[(p - q)^2 + pq + 1]
= a(p - q)^2 since pq = -1

Now we know x/a = p - q

Therefore y = x^2/a
x^2 = ay

Which is a parabola with focal length a/4 and vertex at the origin

In locus and the parabola, there will always be a small piece of information which makes the question solvable.
 

nrlwinner

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Thanks for the help so far. I'm nearly finished parametrics. Just a couple of last questions.

Here's a question I simply cannot do.
Tangets are drawn to a parbola x^2=4y from an external point A(x1,y1) touching the parabola at P and Q. Prove that the midpoint, M, of PQ is the point



Also. I cannot turn this point into a locus. There doesn't seem to be any other information in the question that can help me. My points are

 

untouchablecuz

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Thanks for the help so far. I'm nearly finished parametrics. Just a couple of last questions.

Here's a question I simply cannot do.
Tangets are drawn to a parbola x^2=4y from an external point A(x1,y1) touching the parabola at P and Q. Prove that the midpoint, M, of PQ is the point



Also. I cannot turn this point into a locus. There doesn't seem to be any other information in the question that can help me. My points are



did you mistype the y coordinate for the first Q?

also, can you check over the coordinates for the second Q, i have a feeling you mistyped them
 
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nrlwinner

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I've already got the first question. Thanks.

The y coordinate for the 2nd question is meant to be


If that doesn't help, the question is.
If PN is a normal to the parabola x^2=4ay at a variable point P and SN is drawn through the focus S parallel to the tangent at P to cut the normal at N. Find the locus of N
 
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jet

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You made a mistake with the coordinates, I'm not sure where. This is the correct answer:

 

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