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Easy qs from JR Trial (1 Viewer)

kwabon

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ummm lychnobity, from the first batch of question put, for the second part of the parametric thingo, no one seems to show the working for it.

i will do it if you want. just ask.

(y)
 

lychnobity

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ummm lychnobity, from the first batch of question put, for the second part of the parametric thingo, no one seems to show the working for it.

i will do it if you want. just ask.

(y)
If it's not too much trouble, then yeah, it'd be good if you can do it.
 

kwabon

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P(2at , at^2) Q(2au, au^2)
y = tx - at^2
y = ux - au^2
point of intersection R (a(u + t) , aut)

draw a diagram.
plot R on your plane.
and draw two tangents to the x^2 = 4ay

if you were to derive and find the general gradient of all tangents to the parabola
you'd get

dy/dx = x/2a

from your diagram you'd notice that the gradients are same but one gradient has to + and the other has to -.

the general equation of tangents was already given to you in part i) and the point of intersection (general point) was given again.

and from part ii) they say that the two tangents intersect at (a , -6a)

so just equate this to the general point of intersection
a( u + t ) = a
aut = -6a

a simple case of substitution and you will get values for u and t, end up being
u = 3 or -2
t = -2 or 3

sub those values into
P( 2at , at^2) Q ( 2au , au^2)

and then from your diagram draw chord PQ, and then you will see a triangle appear.
and from there just use the distance formula to prove that either of the sides of the triangle are equal and voila, bob is your uncle, you proven the triangle is an isosceles.

(y)

PS : have you noticed that at the end of every post, i leave a (y) which is the same as my avatar (thumbs up).

gosh, i am so witty :rolleyes:.
 

lychnobity

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Whoa, nice work kwabon.

And I stared at your avatar for a whole minute and still didn't figure it out. Where's the y in that?
 

hermand

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(Y) is the msn emoticon for thumbs up =]].
 

lychnobity

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(Y) is the msn emoticon for thumbs up =]].
fml *facepalm*

EDIT: And another question

A man has a loan of $15800 with monthly reducible interest of 8% pa. If the repayments are $1250/month, find the no. payments to repay the loan.

I've bloody forgotten all this 2u crap
 
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mmo

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use series in this and the principal formula
Make sure u use abbreviations to make things easier for monthly repayments,
ie, M, 2M, 3M etc...

That looks ok
again abbreviations would've made life easier
This is an area where they haven't tested for a while so you'll never know what's in the 09 ext 1 exam!!!!!
 
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cutemouse

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A man has a loan of $15800 with monthly reducible interest of 8% pa. If the repayments are $1250/month, find the no. payments to repay the loan.

I've bloody forgotten all this 2u crap
[text]8% \ p.a. = 0.006 \ldots \ p.m.[/tex]

Let P=15800 ; Monthly repayment, M = 1250

The amount owing after 1 repayment, A1=P(
 

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