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Trigonometric Values (1 Viewer)

FDownes

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Bingo! Could I have a look at your working please? I'm really stuck on this one.
 

Mark576

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I got the same answer. So it's likely that we're correct.
 

SpinCobra

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04√3 dt / (16 + t2)3/2

-----------------------
Let..
t = 4 tan Ө
dt = 4 sec2Ө dӨ

when t = 0, Ө = 0
when t = 4√3, Ө = pi/3

-----------------------

Therefore

04√3 dt / (16 + t2)3/2

= 0pi/3 (4 sec2Ө) dӨ / (16 + 16 tan2Ө)3/2

= 0pi/3 (4 sec2Ө) dӨ / (4√(1 + tan2Ө))3

= 0pi/3 (4 sec2Ө) dӨ / (4√(sec2Ө))3

[√(sec2Ө) = sec Ө]

= 0pi/3 (4 sec2Ө) dӨ / (43 sec3Ө)

(Cancel crap on top and bottom?)

= 0pi/3 dӨ / 16 sec Ө

(Take 1/16 outside integral)

= 1/160pi/3 dӨ / sec Ө

= 1/160pi/3 cos Ө dӨ

Integrate.
 

Slidey

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It's nice of you to try and do it neatly man, but seriously just use sqrt, ^, Int, ^(1/2), @ for theta, etc.

We'll still understand you. :D
 

FDownes

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You guys have been awesome so far, lets see if we can keep up the record with one more problem;

a) Write down an expression for sin 3x in terms of sin x.

b) Hence find 0pi/6 sin3x dx.
 

tommykins

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From memory..

sin 3x = 4sinx - 3sin³x
3sin³x = 4sinx - sin 3x
sin³x = (4sinx - sin3x)/3
sin3x dx.

= 1/3 ∫ 4sinx - sin3x dx
= 1/3[ -4cosx + cos3x/3 ]0 -> pi/6

Go on from there -

PS. I feel really iffy on the trig expansaion, I did it in clas and couldn't find the shet so I'm doing ti solely based on memory, if I'm wrong please point it out.
 

cwag

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Edit. sin3x in terms of sin x = 3sin x- 4 sin<sup>3</sup>x
Proof...sin 3x = sin(2x+x)
=2sinxcos<sup>2</sup>x + sin x - 2sin<sup>3</sup>x
=2sinx - 2 sin<sup>3</sup>x + sinx - 2sin<sup>3</sup>x
=3sinx - 4sin<sup>3</sup>x

therefore <sub>0</sub>∫<sup>pi/6</sup> sin<sup>3</sup>x
=1/4 <sub>0</sub>∫<sup>pi/6</sup> 3sinx-sin3x
=1/4 [-3cosx + (cos 3x)/3]<sub>0</sub><sup>pi/6</sup>
=1/4 ((-3root3)/2 - (-3+1/3))
=1/4 ((-3root3)/2 + 8/3)
approx = 0.017
 

FDownes

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Stuck once again. Here we go;

Given that y = e-x(cos2x + sin2x), show that y'' + 2y' + 5y = 0
 

Zephyrio

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FDownes said:
Stuck once again. Here we go;

Given that y = e-x(cos2x + sin2x), show that y'' + 2y' + 5y = 0
Differentiate using the product rule.

Find the second derivative.

Then sub these values into y'' + 2y' + 5y. Should equal 0.
 

FDownes

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My problem is that I'm having some trouble differentiating the function. Could somebody walk me through the problem, please?
 

cwag

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y = e-x (cos 2x + sin 2x)

y'=u'v + v'u (product rule)

u'v = -e-x(cos2x+sin2x)
v'u = (-2sin2x + 2cos2x)e-x.......because derivative of cos ax = -asinax, and derivative of sin ax = acos ax

therefore y'= -e-x(cos2x+sin2x) + (-2sin2x + 2cos2x)e-x

if we take a common factor of e-x
we get y' = e-x{(-cos2x-sin2x)+(-2sin2x + 2cos2x)}

by simplifing further we get
y'= e-x(cos2x - 3sin2x)

Edit: now y" = -e-x(cos 2x - 3 sin2x)+e-x(-2sin2x-6cos 2x)
y"= e-x{(-cos 2x + 3 sin2x) + (-2sin2x - 6cos2x)}
y"= e-x(-7cos2x + sin2x)

therefore. y" + 2y' + 5y = e-x(-7cos2x + sin2x) +2e-x(cos2x - 3sin2x) + 5e-x (cos 2x + sin 2x)

= -7cos(2x).e-x+ sin(2x).e-x + 2cos(2x).e-x - 6sin(2x)e-x + 5cos(2x)e-x + 5sin(2x)e-x

which = 0 hooray.....please don't tell me theres an easier way to do that thou
 
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Mark576

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y=e<sup>-x</sup>(cos2x+sin2x)
yex=cos2x+sin2x
yex+y'ex=-2sin2x+2cos2x [differentiating both sides]
ex(y+y')=-2sin2x+2cos2x
ex(y+y')+ex(y'+y'')=-4cos2x-4sin2x [differentiating both sides]
ex(y''+2y'+y)=-4(cos2x+sin2x)
y''+2y'+y=-4y
y''+2y'+5y=0

Quite a neat method.
 

cwag

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Mark576 said:
y=e<sup>-x</sup>(cos2x+sin2x)
yex=cos2x+sin2x
yex+y'ex=-2sin2x+2cos2x [differentiating both sides]
ex(y+y')=-2sin2x+2cos2x
ex(y+y')+ex(y'+y'')=-4cos2x-4sin2x [differentiating both sides]
ex(y''+2y'+y)=-4(cos2x+sin2x)
y''+2y'+y=-4y
y''+2y'+5y=0

Quite a neat method.
haha...looks like u got me again mark:p
 

FDownes

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Thanks very much...

Oh, and one quick question while I'm here; would cos22x be equal to 1/2(1 - cos4x)?
 

cwag

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FDownes said:
Thanks very much...

Oh, and one quick question while I'm here; would cos22x be equal to 1/2(1 - cos4x)?
No, close...its 1/2 (1 + cos4x)
its always double the angle and a - sign for sin and + sin for cos...eg....cos25x = 1/2(1 + cos10x).....sin2x/2 = 1/2(1-cosx)
 

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