Extension One Revising Game (1 Viewer)

bored of sc

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addikaye03 said:
Question: ( to keep things going, its 4U tho)
a)If z1=1+i,z2=rt3-i, find the moduli and principal arguments of z1,z2 and z1/z2
a) |z1| = sqrt(2)
arg(z1) = pi/4
|z2| = 2
arg(z2) = -pi/6
z1/z2 = {sqrt(2)cis[pi/4]}/{2cis[-pi/6]}
= [sqrt(2)/2]*cis[5pi/12]
 

bored of sc

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Derive the quadratic formula by completing the square

Hint: begin with ax2+bx+c = 0
 

azureus88

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ax^2 + bx + c = 0
a(x^2 + (b/a)x) = -c
a(x^2 + (b/a)x + (b/2a)^2) = -c + (b^2)/4a
a(x + b/2a)^2 = (b^2 - 4ac)/4a
(x + b/2a)^2 = (b^2 - 4ac)/4a^2
(x + b/2a) = +or- [sqrt(b^2 - 4ac)]/2a

x = {-b+or- [sqrt(b^2 - 4ac)]}/2a
 
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lolokay

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find the limiting sum of 1 - x2 + x4 - x6 + x8 ...
given that 0 < or = x < 1

hence find the limiting sum of 1 - 1/3 + 1/5 - 1/7 + 1/9 - 1/11 ...
 
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Trebla

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The answer is π/4, but I'll let others work it out themselves lol. However, some of the answers to this question I have seen are technically flawed, so see if you guys can do it with technical precision (it requires a common Ext2 technique to get it technically precise though lol)
 
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lolokay

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is there anything wrong with
1 - x2 + x4 - x6 + x8 ... = 1/(1+x2)
{integral from 0 to 1}[1 - x2 + x4...]dx = {integral from 0 to 1}1/(1+x2)dx

[x - 1/3x3 + 1/5x5 ... ]1,0 = [tan-1x]1,0
1 - 1/3 + 1/5 - 1/7 ... - 0 = pi/4 - 0
 
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addikaye03

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lolokay said:
find the limiting sum of 1 - x2 + x4 - x6 + x8 ...
given that 0 < x < 1

hence find the value of 1 - 1/3 + 1/5 - 1/7 + 1/9 - 1/11 ...
1-x^2+x^4-x^6+x^8... [G.P, r=-x^2, a =1]
S=1/(1+x^2)=d/dx(tan^-1x)
therefore, 1-x^2+x^4-x^6+x^8...=d/dx(tan^-1x)
x-x^3/3+x^5/5-x^7/7+x^9/9-x^11/11...+C=tan^-1x+C....( when x=0, both sides = 0 .'. no constant)

By equating 1 - 1/3 + 1/5 - 1/7 + 1/9 - 1/11 ...
tan^-1x=1 therefore pi/4
 
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Trebla

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lolokay said:
is there anything wrong with
1 - x2 + x4 - x6 + x8 ... = 1/(1+x2)
{integral from 0 to 1}[1 - x2 + x4...]dx = {integral from 0 to 1}1/(1+x2)dx

[x - 1/3x3 + 1/5x5 ... ]1,0 = [tan-1x]1,0
1 - 1/3 + 1/5 - 1/7 ... - 0 = pi/4 - 0
The fact that you've included 0 and 1 as limits in the integral with respect to x when they are excluded from x in the original question is the technical issue...lol
 

lolokay

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oh right.. well you can just include 0; that doesn't affect the limiting sum
not too sure about the 1 though.. unless you make the limit 1- (value of x as x->1), such that it is just below 1, but the sum still approaches the value for x=1.. or something
 
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addikaye03

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does my solution have technical issues too? lol i think it does

QUESTION:If a,b are real positive numbers, Prove (a+b)^2(1/a^2+1/b^2)>=8
 
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lolokay

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addikaye03 said:
does my solution have technical issues too? lol i think it does

QUESTION: Prove (a+b)^2(1/a^2+1/b^2)>=8
(a-b)2 >= 0
a2 + b2 >= 2ab
a/b + b/a >= 2 (dividing by ab which is >0 as a,b >0)
similarly, a2/b2 + b2/a2 > 2

(a+b)^2(1/a^2+1/b^2)
= (a2 + 2ab + b2)(1/a2 + 1/b2)
= 1 + a2/b2 + 2b/a + 2a/b + b2/a2 + 1
= 2 + 2[a/b + b/a] + [b2/a2 + a2/b2]
>= 2 + 2(2) + 2
= 8

.'. (a+b)^2(1/a^2+1/b^2)>=8 a,b>0



Another question:
solve for x; (x+1)(x+2)(x+3)(x+4) = 8
 
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Trebla

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I think also, it's more of an issue with the way the question was set up, but anyway since another question is being asked I might as well type up the more technically precise way (and also because I'm bored) lol:

Consider a general geometric series (not necessarily limiting sum)
1 - x² + x4 - x6 + …… + (–1)nx2n
a = 1, r = - x² and there are n + 1 terms, so this equals:
1[1 - (- x²)n + 1)] / [1 - (- x²)] = [1 - (-1)n + 1x2n + 2] / [1 + x²]
= [1 - (-1)(-1)nx2n + 2] / [1 + x²]
= [1 + (-1)nx2n + 2] / [1 + x²]
1 - x² + x4 - x6 + …… + (–1)nx2n = [1 + (-1)nx2n + 2] / [1 + x²]
Integrating both sides with respect to x with limits 0 to 1 (notice there is no restriction on x)
01 {1 - x² + x4 - x6 + …… + (–1)nx2n}dx = ∫01 (1 + (-1)nx2n + 2) dx / (1 + x²)
[1 - x² + x4 - x6 + …… + (–1)nx2n]01 = ∫01 {dx / [1 + x²]} + (-1)n01 (x2n + 2) dx / (1 + x²)
1 - 1/3 + 1/5 - 1/7 + ..... + (–1)n / (2n + 1) = [tan-1x]01 + ∫01 (x2n + 2) dx / (1 + x²)
Σnk = 0 (–1)k / (2k + 1) = π/4 + ∫01 (x2n + 2) dx / (1 + x²)

But
x² ≥ 0
x² + 1 ≥ 1
1 / (x² + 1) ≤ 1
=> x2n + 2 / (x² + 1) ≤ x2n + 2
Note no change of sign as x2n + 2 is always positive for all real x
01 x2n + 2 dx / (x² + 1) ≤ ∫01 x2n + 2 dx
01 x2n + 2 dx / (x² + 1) ≤ 1 / (2n + 3)
Also, since the integrand is non-negative, in integral is also non-negative hence
0 ≤ ∫01 x2n + 2 dx / (x² + 1) ≤ 1 / (2n + 3)
As n --> ∞, 1 / (2n + 3) --> 0, so the ∫01 x2n + 2 dx / (x² + 1) --> 0
(known by the rather graphic name as the "squeeze law" lol)
Hence as n --> ∞:
Σk = 0 (–1)k / (2k + 1) = π/4

*sighs* that took a lot of typing up codes lol...

The inequality set up makes it more of an Extension 2 question. A similar question of this series was asked in a past HSC exam for Extension 2 in 2004 Q8 but it involved an integration reduction formula for sinnx and the proof steps required stopped at the inequalities bit though (the explicit series itself was not required for proof in the question).
 
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lolokay

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so you're not able to put a limit in the integal?, ie.
0n (1/(1+x²))dx as n approaches 1 (approaching from values less than 1)
= tan-1n which has a limit of pi/4

0n (1 - x2 + x4 - ...)dx as n approaches 1
= n - 1/3n3 + ...
but as n approaches 1, nm for some integer m, also approaches 1
.'. the integral has a limit 1 - 1/3 + 1/5 - 1/7 + ...
and then equate the two limits

+anyone who hasn't read through the solutions, feel free to have a go, or at least think about the original question
 

Trebla

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lolokay said:
so you're not able to put a limit in the integal?, ie.
0n (1/(1+x²))dx as n approaches 1 (approaching from values less than 1)
= tan-1n which has a limit of pi/4

0n (1 - x2 + x4 - ...)dx as n approaches 1
= n - 1/3n3 + ...
but as n approaches 1, nm for some integer m, also approaches 1
.'. the integral has a limit 1 - 1/3 + 1/5 - 1/7 + ...
and then equate the two limits

+anyone who hasn't read through the solutions, feel free to have a go, or at least think about the original question
Yeah, that would also work...as opposed to my rather convoluted method lol :p
though I'm not sure if an integral approaching a limit is still within the scope of the course...haha
 

bored of sc

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addikaye03 said:
b) If z=(1+i)/(rt3-i), find the smallest postive integer n such that z^n is real and evaluate z^n for this integer n.
z = rt2/2*cis75

cos(75) = cos(45+30)
= cos45*cos30-sin45*sin30
= 1/rt2*rt3/2-1/rt2*1/2
= (rt3-1)/2rt2

sin(75) = sin(45+30)
= sin45*cos30+sin30*cos45
= 1/rt2*rt3/2+1/2*1/rt2
= (rt3+1)/2rt2

z = rt2/2*{[(rt3-1)/2rt2]+[(rt3+1)/2rt2]i}
= 2rt2/4*{[(rt6-rt2)/4]+[(rt6+rt2)/4]i}
= (2rt12-4)/16 + (2rt12+4)/16*i
= (rt3-1)/4 + (rt3+1)/4*i
= (rt3-1+rt3i+i)/4

i0 = 1
i1 = i
i2 = -1
i3 = -i
i4 = 1
i5 = i
i6 = -1
i7 = -i

No idea where to go to!
 

bored of sc

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Can you guys post up an easier question from an area like circle geometry or trigonometry?
 

addikaye03

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bored of sc said:
z = rt2/2*cis75

cos(75) = cos(45+30)
= cos45*cos30-sin45*sin30
= 1/rt2*rt3/2-1/rt2*1/2
= (rt3-1)/2rt2

sin(75) = sin(45+30)
= sin45*cos30+sin30*cos45
= 1/rt2*rt3/2+1/2*1/rt2
= (rt3+1)/2rt2

z = rt2/2*{[(rt3-1)/2rt2]+[(rt3+1)/2rt2]i}
= 2rt2/4*{[(rt6-rt2)/4]+[(rt6+rt2)/4]i}
= (2rt12-4)/16 + (2rt12+4)/16*i
= (rt3-1)/4 + (rt3+1)/4*i
= (rt3-1+rt3i+i)/4

i0 = 1
i1 = i
i2 = -1
i3 = -i
i4 = 1
i5 = i
i6 = -1
i7 = -i

No idea where to go to!
think arg (z^n)=narg(z), and umm.. arg(z^n)=kpi, where K is 0, +-1,+-2,...
 
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