• Congratulations to the Class of 2024 on your results!
    Let us know how you went here
    Got a question about your uni preferences? Ask us here

HSC Mathematics Marathon (3 Viewers)

blackops23

Member
Joined
Dec 15, 2010
Messages
428
Gender
Male
HSC
2011
Can someone please answer my conics question on like page 2 or 3, so I can get some questions going too.
Here's the FULL SOLUTION, only doing this because this is the one of the two questions i've been able to do in the marathon =(, also I dunno, if Anchovies still wants to know how to do it, (assuming he doesn't...)

--------

New question:

P(x1, y1) is a point on the hyperbole x^2/a^2 - y^2/b^2 = 1 with foci S, S'

(a) Find the equation of the tangent to the hyperbole at P.
(b) The tangent meets the x-axis in T. Show that PS/PS' = TS/TS'
(a) Implicit diffrentiation:
2x/a^2 - 2yy'/b^2 = 0
y' = (2x/a^2)*(b^2/2y)
y' = [b^2(x)]/[a^2(y)]
y-y1 = [b^2(x)/a^2(y)]*(x-x1)
Multiply through a^2(y)
(a^2)(y^2) - a^2(y)(y1) = (b^2)(x^2) - (b^2)(x)(x1)
(b^2)(x)(x1) - (a^2)(y)(y1) = (b^2)(x^2) - (a^2)(y^2)
Divide by (a^2)(b^2)

Tangent: (x)(x1)/a^2 - (y)(y1)/b^2 = 1
---------------------------------------------------

(b) To find T, sub in y=0 in equation of tangent.

therefore T=(a^2/x1 , 0)

Now e = PS/PM = PS'/PM'

So (PS/PM)divided by(PS'/PM') = e/e = 1
therefore:
(PS/PS')*(PM'/PM)=1
(PS/PS') = PM/PM'
Now PM/PM' =
= [x1 - (a/e)]/[x1 + (a/e)]
= [e(x1)-a]/[e(x1) + a]

Now TS/TS' = [ae - (a^2/x1)] / [ae + (a^2/x1)]
= [ae(x1) - a^2]/[ae(x1) + a^2]
= [e(x1) - a]/[e(x1) + a]
= PS/PS'

On paper it looks a lot more simpler...
 
Last edited:
Joined
Apr 3, 2010
Messages
777
Gender
Male
HSC
2011
Here's the FULL SOLUTION, only doing this because this is the one of the two questions i've been able to do in the marathon =(, also I dunno, if Anchovies still wants to know how to do it, (assuming he doesn't...)



(a) Implicit diffrentiation:
2x/a^2 - 2yy'/b^2 = 0
y' = (2x/a^2)*(b^2/2y)
y' = [b^2(x)]/[a^2(y)]
y-y1 = [b^2(x)/a^2(y)]*(x-x1)
Multiply through a^2(y)
(a^2)(y^2) - a^2(y)(y1) = (b^2)(x^2) - (b^2)(x)(x1)
(b^2)(x)(x1) - (a^2)(y)(y1) = (b^2)(x^2) - (a^2)(y^2)
Divide by (a^2)(b^2)

Tangent: (x)(x1)/a^2 - (y)(y1)/b^2 = 1
---------------------------------------------------

(b) To find T, sub in y=0 in equation of tangent.

therefore T=(a^2/x1 , 0)

Now e = PS/PM = PS'/PM'

So (PS/PM)divided by(PS'/PM') = e/e = 1
therefore:
(PS/PS')*(PM'/PM)=1
(PS/PS') = PM/PM'
Now PM/PM' =
= [x1 - (a/e)]/[x1 + (a/e)]
= [e(x1)-a]/[e(x1) + a]

Now TS/TS' = [ae - (a^2/x1)] / [ae + (a^2/x1)]
= [ae(x1) - a^2]/[ae(x1) + a^2]
= [e(x1) - a]/[e(x1) + a]
= PS/PS'

On paper it looks a lot more simpler...


Is this the same method Terry Lee uses? Because I can't be bothered reading all that writing lol.

Good job though.
 

blackops23

Member
Joined
Dec 15, 2010
Messages
428
Gender
Male
HSC
2011
Is this the same method Terry Lee uses? Because I can't be bothered reading all that writing lol.

Good job though.
I dunno if Terry Lee did this, but this is my own method I created for my exam - there was an almost similar question, just involving an ellipse instead of a hyperbola in my exam.
 
Joined
Apr 3, 2010
Messages
777
Gender
Male
HSC
2011
I dunno if Terry Lee did this, but this is my own method I created for my exam - there was an almost similar question, just involving an ellipse instead of a hyperbola in my exam.
I didn't need it answered, I just wanted to keep the thread going with non-complex number questions. :p

Interesting method though.
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,401
Gender
Male
HSC
2006
Show that for all real x:
1 + x2 > 2x

Hence deduce that:
ex > 1 + x2
 

funnytomato

Active Member
Joined
Jan 21, 2011
Messages
847
Gender
Male
HSC
2010
Show that for all real x:
1 + x2 > 2x

Hence deduce that:
ex > 1 + x2
don't think it's a legit question. cos it's true if x is restricted to non-negative real numbers. and I haven't really seen why x can't be -ve
 

deterministic

Member
Joined
Jul 23, 2010
Messages
423
Gender
Male
HSC
2009
Impossible. Just try x=-1.
+1. This highlights the flaw in assuming if f(x)>g(x) for all x, then the primitives of both functions share the sample property (ie.F(x)>G(x) for all x) due to differing constants of integration.
 

cutemouse

Account Closed
Joined
Apr 23, 2007
Messages
2,250
Gender
Undisclosed
HSC
N/A
Here you said f(x) is a rule. The other post you said f(x) is a value. What is it?
f(x)=x^2+1 is a rule for the function f.

f(x) is the value of the function f at the point 'x'.
 

jyu

Member
Joined
Nov 14, 2005
Messages
623
Gender
Male
HSC
2006
Lol, if you're going to be all smart using notation not used in the HSC then at least get it all right. f(x) isn't a function; it's a rule.
So you are now saying you were talking nonsense when you said 'f(x) isn't a function; it's a rule'.
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,401
Gender
Male
HSC
2006
Woops, screwed up the question. Here it is again:

Show that for x > 0:
1 + x2 > 2x

Hence deduce that for x > 0:
ex > 1 + x2
 

cutemouse

Account Closed
Joined
Apr 23, 2007
Messages
2,250
Gender
Undisclosed
HSC
N/A
So you are now saying you were talking nonsense when you said 'f(x) isn't a function; it's a rule'.
f(x)=x^2+1 is a rule for the function f.

f(x) is the value of the function f at the point 'x'.

Woops, screwed up the question. Here it is again:

Show that for x > 0:
1 + x2 > 2x

Hence deduce that for x > 0:
ex > 1 + x2
Isn't the first part true for all real values of x?
 
Joined
Jan 13, 2011
Messages
354
Gender
Male
HSC
N/A
Isn't the first part true for all real values of x?
yes but its quite obvious you use it in the second part, and since the second part is only for positive x they decided they might as well make the first part prove for x>0
 

funnytomato

Active Member
Joined
Jan 21, 2011
Messages
847
Gender
Male
HSC
2010
some one should make a new thread about how to use LaTex since the old one isn't working and I haven't even found where it is yet,lol
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,401
Gender
Male
HSC
2006
Isn't the first part true for all real values of x?
It still holds for x > 0 (which is necessary for the second part) which is a subset of the reals.
 

nrlwinner

Member
Joined
Apr 18, 2009
Messages
194
Gender
Male
HSC
2010
I'll put up a question for now:

Show, by mathematical induction, that |z_1+z_2+⋯+z_n |≤|z_1 |+|z_2 |+⋯+|z_n |
 

jyu

Member
Joined
Nov 14, 2005
Messages
623
Gender
Male
HSC
2006
I'll put up a question for now:

Show, by mathematical induction, that |z_1+z_2+⋯+z_n |≤|z_1 |+|z_2 |+⋯+|z_n |
I'll do it anyway:

|z_1|≤|z_1 | true
Assume |z_1+z_2+⋯+z_k |≤|z_1 |+|z_2 |+⋯+|z_k | true
.: |z_1+z_2+⋯+z_k+1 |≤|z_1+z_2+⋯+z_k |+|z_k+1|≤|z_1 |+|z_2 |+⋯+|z_k | +|z_k+1| true
.: |z_1+z_2+⋯+z_n |≤|z_1 |+|z_2 |+⋯+|z_n | true
 

Users Who Are Viewing This Thread (Users: 0, Guests: 3)

Top