HSC Mathematics Marathon (1 Viewer)

Drongoski · Feb 24, 2011

HyperComplexxx said:
If z is a complex number such that z = r(cosθ +isinθ), where r is real, show that arg(z+r) = (1/2)θ .

$\therefore z+r = r + rcos \theta +irsin \theta$

$\therefore arg(z+r) = tan^{-1} \frac {rsin \theta}{r(1+cos \theta )} = tan ^ {-1} \frac { 2sin \frac{\theta}{2}cos \frac {\theta}{2} }{2cos^2 \frac{\theta }{2}} = tan^{-1} tan \frac {\theta }{2} = \frac {\theta}{2}$

Geometrically, on an Argand diagram, you have a position vector, from origin of length r and with angle $\theta$ . Drawing a vector from end of this vector z to the right of length r, you now have 2 adjacent sides of a rhombus (sides of length r); z+r is then represented by the diagonal of this rhombus from the origin to the tip of vector z+r. By property of rhombus, this vector bisects the angle $\theta$ .

HyperComplexxx · Feb 24, 2011

Polynomial x^4 + qx^2 +rx + s = 0 has roots α, β, γ, δ. Find the value of the constant

term in the polynomial with roots 1-α^2 , 1-β^2 , 1-γ^2 , 1- δ^2.

jyu · Feb 26, 2011

HyperComplexxx said:
Polynomial x^4 + qx^2 +rx + s = 0 has roots α, β, γ, δ. Find the value of the constant

term in the polynomial with roots 1-α^2 , 1-β^2 , 1-γ^2 , 1- δ^2.

(1-α^2)(1-β^2)(1-γ^2)(1-δ^2)
=(1-α)(1-β)(1-γ)(1-δ)(1+α)(1+β)(1+γ)(1+δ)
=(1+q+r+s)(1+q-r+s)

HyperComplexxx · Feb 26, 2011

jyu said:
(1-α^2)(1-β^2)(1-γ^2)(1-δ^2)
=(1-α)(1-β)(1-γ)(1-δ)(1+α)(1+β)(1+γ)(1+δ)
=(1+q+r+s)(1+q-r+s)

rawrence · Feb 27, 2011

jyu said:
(1-α^2)(1-β^2)(1-γ^2)(1-δ^2)
=(1-α)(1-β)(1-γ)(1-δ)(1+α)(1+β)(1+γ)(1+δ)
=(1+q+r+s)(1+q-r+s)

I got (q+s+1)²-r² which is equivalent but by first finding the equation which has roots (1-α²)(1-β²)(1-γ²)(1-δ²)

I like your method of finding products of roots but could you explain how you got from
HERE
=(1-α)(1-β)(1-γ)(1-δ)(1+α)(1+β)(1+γ)(1+δ)
TO
=(1+q+r+s)(1+q-r+s)
THERE?

Cheers

UnrealAnchovies · Mar 3, 2011

Expand P(x) = (x-1)(x+2)(x-3)(x+1)

And for the sake of the exercise, please don't just expand.

hscishard · Mar 3, 2011

UnrealAnchovies said:
Expand P(x) = (x-1)(x+2)(x-3)(x+1)

And for the sake of the exercise, please don't just expand.

just use the roots and to find the coefficients

Drongoski · Mar 4, 2011

ohexploitable said:
$\\\text{If }\omega\text{ is a non-real }n\text{th root of 1, show that }(1-\omega)(1-\omega^2)(1-\omega^3)...(1-\omega^{n-1})=n.$

How about checking out the following.

$\omega = cis \frac {2\pi}{3} $ is a non-real root of $ z^6 = 1$

ohexploitable · Mar 8, 2011

Drongoski · Mar 9, 2011

ohexploitable said:
$\int\frac{\sin x}{2-\sin x}\,dx$

Looks deceptively easy.

Please look at my post above re n-th roots of 1.

rawrence · Mar 13, 2011

ohexploitable said:
$\int\frac{\sin x}{2-\sin x}\,dx$

Using t-result substitution and partial fractions I get down to:
2 [int 1/(t²-t+1) dt - int 1/t² +1 dt]
2 [int dt/((t-1/2)² + 3/4)] - 2[int dt/(t²+1)]
2 [2/(√3)*tan-1 (t-1/2)/(√3/2) - tan-1 t] + C

which is both unsimplified and illegible because I can't latex

ohexploitable · Mar 13, 2011

rawrence said:
Using t-result substitution and partial fractions I get down to:
2 [int 1/(t²-t+1) dt - int 1/t² +1 dt]
2 [int dt/((t-1/2)² + 3/4)] - 2[int dt/(t²+1)]
2 [2/(√3)*tan-1 (t-1/2)/(√3/2) - tan-1 t] + C

which is both unsimplified and illegible because I can't latex

You're correct.

This should make it easier for anyone who wants the solution:

$\\\int\frac{\sin x}{2-\sin x}\,dx\\=-\int\frac{2-\sin x-2}{2-\sin x}\,dx\\=-\int\left(1-\frac{2}{2-\sin x}\right)\,dx\\=\int\left(\frac{2}{2-\sin x}-1\right)\,dx\\=\int\frac{2}{2-\sin x}\,dx-x$

-----

$\\\text{Let }t=\tan\frac{x}{2}\\x=2\tan^{-1}t\\\frac{dx}{dt}=\frac{2}{1+t^2}\\dx=\frac{2}{1+t^2}\,dt$

-----

$\\t=\tan\frac{x}{2}\\\sin x=\frac{2t}{1+t^2}$

-----

$\\2\int\frac{1}{2-\sin x}\,dx-x\\=2\int\frac{\frac{2}{1+t^2}}{2-\frac{2t}{1+t^2}}\,dt-x\\=2\int\frac{2}{2+2t^2-2t}\,dt-x\\=2\int\frac{1}{t^2-t+1}\,dt-x\\=2\int\frac{1}{t^2-t+\frac14+\frac34}\,dt-x\\=2\int\frac{1}{\left(t-\frac12\right)^2+\left(\frac{\sqrt3}{2}\right)^2}\,dt-x\\=2\left[\frac{2}{\sqrt3}\tan^{-1}\left(\frac{t-\frac12}{\frac{\sqrt3}{2}}\right)\right]-x+C\\=\frac{4}{\sqrt3}\tan^{-1}\left(\frac{2t-1}{\sqrt3}\right)-x+C\\=\frac{4}{\sqrt3}\tan^{-1}\left(\frac{2\tan\frac{x}{2}-1}{\sqrt3}\right)-x+C$

Drongoski · Mar 13, 2011

Answer looks like one I got few days ago.

rawrence · Mar 13, 2011

I typed on word LOL!

my bad should be tan(x/2) not inverse

UnrealAnchovies · Mar 13, 2011

ohexploitable said:
$\int\frac{\sin x}{2-\sin x}\,dx$

Pretty good question tbh.

Drongoski · Mar 14, 2011

ohexploitable · Mar 14, 2011

Drongoski said:
$\int \frac{cot xdx}{ln sin x}$

$\\\text{Let }u=\log(\sin x)\text{ so }du=\cot x\,dx\\\\\int\frac{\cot x\,dx}{\log(\sin x)}\\=\int\frac{du}{u}\\=\log u+C\\=\log[\log(\sin x)]+C$

Drongoski · Mar 14, 2011

Very good. Maybe should have posted under Ext 1.

hscishard · Mar 14, 2011

Differentiate x+y+z = 0

rawrence · Mar 14, 2011

^ cool story

$\\\\a)\text{ The polynomial } P(x) = ax^{n+1} + bx^n + 1\text{ is divisible by }(x-1)^2\\ \text{Show that }a = n \text{ and } b = -(1+n) \\\\b)\text{ Show that } P(x) = \frac{x^4}{4!} + \frac{x^3}{3!} + \frac{x^2}{2!} + x + 1\text{ has no double roots}$

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