2009 Hills Grammar 4u trial, Q4 b) help plz? (1 Viewer)

darkfenrir · Jan 31, 2013

I forgot what to do...

darkfenrir · Jan 31, 2013

Someone help me please?

asianese · Jan 31, 2013

i) Use y=c^2/x and differentiate. Sub in the line equation with T and you'll get it.

ii) Replace t with p and q in the tangent equation. Solve simultaneously for X and Y.

iii) use X= whatever it is, Y= whatever it is, and manipulate it so that you can incorporate p^2+q^2=2 into it. Simplify and get the answer.

nightweaver066 · Jan 31, 2013

i) Differentiate x & y values of T w.r.t "t" and find dy/dx. Then use point-gradient formula to get equation of the tangent.

ii) Replace t with p for equation of tangent at P, and replace t with q for equation of tangent at Q. Solve these two equations simultaneously for R.

iii) You find that R is $(\frac{2cpq}{p+q}, \frac{2c}{p+q})$ .

Given that $p^2 + q^2 = 2$

$(p + q)^2 = 2 + 2pq$

$= 2(pq + 1)$

Multiplying x and y coordinates of R together,

$xy = \frac{4c^2pq}{(p+q)^2}$

$= \frac{2c^2pq}{1+pq}$

$= \frac{2c^2pq + 2c^2}{1+ pq} - \frac{2c^2}{1 + pq}$

$= 2c^2 - \frac{2c^2}{\frac{(p+q)^2}{2}}$

$= 2c^2 - \frac{4c^2}{(p+q)^2}$

$= 2c^2 - y^2$

$\therefore xy + y^2 = 2c^2$

Sy123 · Jan 31, 2013

Its just a basic locus question really, I would even classify it as a Harder 3U question.

For part 4bi), what does it say?

'Show that the tangent to the hyperbola at any point T is ..... '

So its asking us to find the tangent to the parabola at point T(ct, c/t), therefore we must find the gradient of the curve at that point (dy/dx)

$y=\frac{c^2}{x} \ \ y'= \frac{-c^2}{x^2}$

Therefore the gradient of the curve at the point T, where x=ct is:

$y'(ct)=\frac{-c^2}{c^2t^2}=\frac{-1}{t^2}$

This is the gradient $m=\frac{-1}{t^2}$ , we already have the point $T(ct,\frac{c}{t})$

Using point gradient formula:

$y-\frac{c}{t} = \frac{-1}{t^2}(x-ct)$

rearrange and collect like terms:

$-t^2y+ct = x-ct \ \ \ \rightarrow x+t^2y-2ct=0$

Part ii)

Now lets use the previous question's identity:

instead of T lets put in P instead and put Q instead:

Equation of line at point P:

$x+p^2y-2cp=0$

Equation of line at point Q

$x+q^2y-2cq = 0$

Now in the question it is given that R is the intersection of these 2 tangents, so lets solve them simultaneously
This is easy enough, we arrive at

$y=\frac{2c}{p+q}$

Sub this into the equation again to get something for x now:

$x=2cp-p^2 \frac{-2c}{p+q} = \frac{2cp(p+q)-2cp^2}{p+q} = \frac{2cpq}{p+q}$

therefore:

$R(\frac{2cpq}{p+q} , \frac{2c}{p+q})$

Part iii)

Here they give us a relationship between p and q, this may be useful for later so lets write it down:

$p^2+q^2=2$

We are given a show that: $xy+y^2=2c^2$

So lets construct this using the co-ordinates of R:

$\frac{2cpq (2c)}{(p+q)^2} + \frac{4c^2}{(p+q)^2} = xy+y^2$

$\frac{4c^2pq + 4c^2}{p^2+q^2+2pq} = \frac{4c^2(1+pq)}{2(1+pq)}$

By expanding the denominator and using teh identity given:

Simplify mroe:

$\frac{4c(1+pq)}{2(1+pq)}=2c^2 \\ \therefore xy+y^2=2c^2$

darkfenrir · Jan 31, 2013

nightweaver066 said:
i) Differentiate x & y values of T w.r.t "t" and find dy/dx. Then use point-gradient formula to get equation of the tangent.

ii) Replace t with p for equation of tangent at P, and replace t with q for equation of tangent at Q. Solve these two equations simultaneously for R.

iii) You find that R is $(\frac{2cpq}{p+q}, \frac{2c}{p+q})$ .

Given that $p^2 + q^2 = 2$

$(p + q)^2 = 2 + 2pq$

$= 2(pq + 1)$

Multiplying x and y coordinates of R together,

$xy = \frac{4c^2pq}{(p+q)^2}$

$= \frac{2c^2pq}{1+pq}$

$= \frac{2c^2pq + 2c^2}{1+ pq} - \frac{2c^2}{1 + pq}$

$= 2c^2 - \frac{2c^2}{\frac{(p+q)^2}{2}}$

$= 2c^2 - \frac{4c^2}{(p+q)^2}$

$= 2c^2 - y^2$

$\therefore xy + y^2 = 2c^2$

thankyou kind sir

I got up to multiplying x and y and simplifying, didnt realise about the +2c^2-2c^2 thing haha

darkfenrir · Jan 31, 2013

Sy123 said:
Its just a basic locus question really, I would even classify it as a Harder 3U question.

For part 4bi), what does it say?

'Show that the tangent to the hyperbola at any point T is ..... '

So its asking us to find the tangent to the parabola at point T(ct, c/t), therefore we must find the gradient of the curve at that point (dy/dx)

$y=\frac{c^2}{x} \ \ y'= \frac{-c^2}{x^2}$

Therefore the gradient of the curve at the point T, where x=ct is:

$y'(ct)=\frac{-c^2}{c^2t^2}=\frac{-1}{t^2}$

This is the gradient $m=\frac{-1}{t^2}$ , we already have the point $T(ct,\frac{c}{t})$

Using point gradient formula:

$y-\frac{c}{t} = \frac{-1}{t^2}(x-ct)$

rearrange and collect like terms:

$-t^2y+ct = x-ct \ \ \ \rightarrow x+t^2y-2ct=0$

Part ii)

Now lets use the previous question's identity:

instead of T lets put in P instead and put Q instead:

Equation of line at point P:

$x+p^2y-2cp=0$

Equation of line at point Q

$x+q^2y-2cq = 0$

Now in the question it is given that R is the intersection of these 2 tangents, so lets solve them simultaneously
This is easy enough, we arrive at

$y=\frac{2c}{p+q}$

Sub this into the equation again to get something for x now:

$x=2cp-p^2 \frac{-2c}{p+q} = \frac{2cp(p+q)-2cp^2}{p+q} = \frac{2cpq}{p+q}$

therefore:

$R(\frac{2cpq}{p+q} , \frac{2c}{p+q})$

Part iii)

Here they give us a relationship between p and q, this may be useful for later so lets write it down:

$p^2+q^2=2$

We are given a show that: $xy+y^2=2c^2$

So lets construct this using the co-ordinates of R:

$\frac{2cpq (2c)}{(p+q)^2} + \frac{4c^2}{(p+q)^2} = xy+y^2$

$\frac{4c^2pq + 4c^2}{p^2+q^2+2pq} = \frac{4c^2(1+pq)}{2(1+pq)}$

By expanding the denominator and using teh identity given:

Simplify mroe:

$\frac{4c(1+pq)}{2(1+pq)}=2c^2 \\ \therefore xy+y^2=2c^2$

Thanks for your time sy

Your and nightweavers explanations are both quite cool, yours is a bit more unorthodox though but it works haha

2009 Hills Grammar 4u trial, Q4 b) help plz? (1 Viewer)

darkfenrir

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asianese

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nightweaver066

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Sy123

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darkfenrir

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