4U Revising Game (1 Viewer)

Kirjava

Member
Joined
May 14, 2007
Messages
32
Gender
Male
HSC
2008
3unitz said:
offline? couldnt do it conics? big swing, no ding.



MP.NP = |(b/a)x0 - y0| / sqrt[(b/a)^2 + 1] . |-(b/a)x0 - y0| / sqrt[(b/a)^2 + 1]
= [(b/a)^2(x0)^2 - (y0)^2] / [(b/a)^2 + 1]
simplifying:
MP.NP = (b^2x0^2 - a^2y0^2) / (b^2 + a^2)

b^2x0^2 - a^2y0^2 = a^2b^2 (equ hyperbola)
.'. MP.NP = a^2b^2 / (b^2 + a^2)
Has there been a post for part iii yet? Might've missed it.

Anyway, Area of triangle PMN = 1/2*PN*PM = a^2b^2/2(b^2 + a^2)... Perhaps that was just trivial enough to go without saying, heh :confused:.

Praise be to whoever's idea this thread was by the way.
 

ronnknee

Live to eat
Joined
Aug 2, 2006
Messages
474
Gender
Male
HSC
2008
aMUSEd1977 said:
How about now? :(
(n+k-1)!
k!(n-1)!

k = 5
n = 14

= 18! ÷ 5!13!
= 8568
Haha honestly, I don't even know myself since I didn't bring up the question =p
 

namburger

Noob Member
Joined
Apr 29, 2007
Messages
228
Gender
Male
HSC
2008
Kirjava said:
Has there been a post for part iii yet? Might've missed it.

Anyway, Area of triangle PMN = 1/2*PN*PM = a^2b^2/2(b^2 + a^2)... Perhaps that was just trivial enough to go without saying, heh :confused:.

Praise be to whoever's idea this thread was by the way.
Sorry but your assuming that angle MPN is a rightangle.
 

ronnknee

Live to eat
Joined
Aug 2, 2006
Messages
474
Gender
Male
HSC
2008
While we wait:

If In = Int [tann x] dx where n >= 0, show that In = [tann-1x / (n - 1)] - In-2
 

undalay

Active Member
Joined
Dec 14, 2006
Messages
1,002
Location
Ashfield
Gender
Male
HSC
2008
ronnknee said:
While we wait:

If In = Int [tann x] dx where n >= 0, show that In = [tann-1x / (n - 1)] - In-2
int tannx dx
= int tann-2x(sec2x -1) dx
= int tann-2xsec2x dx - In-2
= tann-1x / (n-1) - In-2
 

ngogiathuan

Member
Joined
Feb 15, 2007
Messages
33
Gender
Male
HSC
2008
Affinity said:
oh you want hard questions? thats easy:

(polynomials)
x^3 - x^2 -ax - b = 0 has 3 positive roots prove that x^3 -x^2 + bx + a = 0 has 1 positive root and 2 complex roots

prove that log_a(x) cannot be written as the quotient of 2 polynomials with real coefficients

find all polynomials with possibly complex coefficients satisfying p(x^2)-p(x)p(x+1) = 0

(conics)
given ellipse x^2/a^2 + y^2/b^2=1 a find the area of the elliptical sector define by the piece bounded by the ellipse and lines joining points (acos(t),bsin(t)) (acos(u),bsin(u)) to the focus S(ae,0)

(Mechanics)
A rocket accelerates itself by shooting out gases at the rate of m kilograms per sectond at a velocity of v relative to the rocket, if the mass of the rocket is M and initially it carries F kilograms of fuel and it's initial velocity is V, find the distance travelled in time T and it's terminal speed after all fuel has been burnt.

At any time, a particle at position (x,y) is subjected to acceleration of magnitude 10/(x^2 + y^2) towards the origin. initially it is at position (5,0) with velocity sqrt(3) upwards, describe the locus of such particle's path

(counting)
Given n colours, how many different ways can you colour the faces of a cube? two colouring are considered identical if one can rotate one into the other.

(inequality)
It is known that for a certain function f,
f(ua + (1-u)b) >= uf(a) + (1-u)f(b) for all u between 0 and 1 and all a,b.

prove that:

f(u_1 a_1 + u_2 a_2 + ... + u_n a_n) >= u_1 f(a_1) + u_2 f(a_2) + ... + u_n f(a_n)
where u_i are positive and u_i sum to 1.


It is known that f(x) = x^a where 0<1 and x>0 has the property.

hence derive that for 1/p + 1/q = 1, p,q positive

(a_1 b_1 + a_2 b_2 + ... + a_n b_n) <= (a_1^p + a_2^p + ...+ a_n^p)^(1/p) * (b_1^q + b_2^q + ... +b_n^q)^(1/q)

for positive a's and b's.

hence show that

(a_1^p + a_2^p + ...+ a_n^p)^(1/p) + (b_1^p + b_2^p + ...+ b_n^p)^(1/p) >=
((a_1+b_1)^p + (a_2+b_2)^p + ...+ (a_n+b_n)^p)^(1/p) for p>=1



(geometry)

Show that the altitudes of a triangle are concurrent
do the same for the medians
and the perpendicular bisector os sides.
now show the the 3 points where the lines meet are colinear.

ABC is a triangle. D,E lies on side BC, F,G lies on CA and H,I lies on AB.

angle BAD = angle CAE
angle CBF = angle ABG
angle ACH = andgle BCI

prove that if AD,BF and CH are concurrent, then so are AE BG and CI


I will post some more when you finish these ones
Here are some hard questions from affinity, from another topic. I post this again so everyone can have a look.
By the way, conics2008 u said that the conics and polynomial question here were "pretty straightforward". Im very much appreciated if you could post your working here.
 
Last edited:

tommykins

i am number -e^i*pi
Joined
Feb 18, 2007
Messages
5,730
Gender
Male
HSC
2008
Haha bashing on conics2008 is fun, but I guess let's see if he can back up the amount of shit he spills.
 

ronnknee

Live to eat
Joined
Aug 2, 2006
Messages
474
Gender
Male
HSC
2008
undalay said:
int tannx dx
= int tann-2x(sec2x -1) dx
= int tann-2xsec2x dx - In-2
= tann-1x / (n-1) - In-2
How can you just jump from the second last line to the last without working?
 

undalay

Active Member
Joined
Dec 14, 2006
Messages
1,002
Location
Ashfield
Gender
Male
HSC
2008
ronnknee said:
How can you just jump from the second last line to the last without working?
CBF typing, its obvious. (sec^2 is the derivative of tan)
 

conics2008

Active Member
Joined
Mar 26, 2008
Messages
1,228
Gender
Male
HSC
2005
3unitz,, maybe you should go back and read my posts. I knew it was P.D distance, I jst didn't know how to simplify it to make it look like what he asked..

soo that means i wont change my name.

hahahh LoL
 

conics2008

Active Member
Joined
Mar 26, 2008
Messages
1,228
Gender
Male
HSC
2005
tommykins said:
Haha bashing on conics2008 is fun, but I guess let's see if he can back up the amount of shit he spills.
Your one of the shit I spilled.

sorry if i hurt your feelings, no harm done =)
 

namburger

Noob Member
Joined
Apr 29, 2007
Messages
228
Gender
Male
HSC
2008
undalay said:
CBF typing, its obvious. (sec^2 is the derivative of tan)
slack

= int tan<sup>n-2</sup>xsec<sup>2</sup>x dx - I<sub>n-2
= </sub>int tan<sup>n-2</sup>x . [d(tan x)/dx] . [dx] - I<sub>n-2
</sub>{since diffrentiation of tan x with respect to x is sec^2 x}
= int tan<sup>n-2</sup>x d(tan x) - I<sub>n-2
</sub> treat tan x as a u
 

conics2008

Active Member
Joined
Mar 26, 2008
Messages
1,228
Gender
Male
HSC
2005
Hey guys can you do this please.

A triangle has sides 3,4 & 5. A circle has been inscribed.

Find the area of the circle. Thanks
 

ronnknee

Live to eat
Joined
Aug 2, 2006
Messages
474
Gender
Male
HSC
2008
undalay said:
Heres onee:

Graph |x+y| = 2 labeling significant points.
Edit: Wrong solution my bad, it looked like the diamond equation


P(x) is a monic polynomial of degree 4 with interger coefficients and constant term 4. One zero is root 2, another zero is rational and the sum of the zeros is positive. Factorise P(x) over real numbers.
 
Last edited:

kurt.physics

Member
Joined
Jun 16, 2007
Messages
840
Gender
Undisclosed
HSC
N/A
ronnknee said:



P(x) is a monic polynomial of degree 4 with interger coefficients and constant term 4. One zero is root 2, another zero is rational and the sum of the zeros is positive. Factorise P(x) over real numbers.
Im not so sure this is right, my graphing program reakons its the one attached

This is wrong because, for example, at (-1,1) it is

/ -1+1/ doesnt equal 2
 

conics2008

Active Member
Joined
Mar 26, 2008
Messages
1,228
Gender
Male
HSC
2005
sketch this... |x+y|=2

hence x+y=2 and -x-y=2


therefore its two parallel lines with x int = 2 and -2 and y int with 2 and -2


welldone for those two guys that used their graphing program...

Q:?

A triangle has sides 3,4 & 5. A circle has been inscribed.

Find the area of the circle
 
Last edited:

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top