Prelim 2016 Maths Help Thread (3 Viewers)

leehuan · Apr 25, 2016

Rathin said:
I did not think of doing sin^2(θ)-cos^2(θ)
Thank you so much
Would this be better (sin(2θ)+1)/(cos(2θ))=(cos(θ)+sin(θ))/(cos(θ)-sin(θ))?
Legit question, How do i get better at further trig? I dont know why I am so bad...:/

Also yes those brackets are MUCH better

That one around the cos(2θ) wasn't necessary though cause it was the ONLY thing on the denominator

Paradoxica said:
Rathin, I'm sure I'm not the first to mention this but you REALLY need to use brackets.

That expression is too ambiguous for me to decipher instantaneously.

That being said...

$$\noindent$ \frac{1+\sin{2\theta}}{\cos{2\theta}} \equiv \frac{\cos{\theta}+\sin{\theta}}{\cos{\theta}-\sin{\theta}} \\ LHS \equiv \frac{\cos^2{\theta}+2\sin{\theta} \cos{\theta}+\sin^2{\theta}}{\cos^2{\theta}-\sin^2{\theta}} \equiv \frac{(\cos{\theta}+\sin{\theta})^2}{(\cot{\theta}-\sin{\theta})(\cos{\theta}+\sin{\theta})}$

And the result follows through from cancellation.

$$\noindent Identities used:$ 1 \equiv \cos^2{\theta}+\sin^2{\theta},\,\sin{2\theta} \equiv 2\sin{\theta}\cos{\theta}$

And of course also the cosine double angle identity

Green Yoda · Apr 25, 2016

lol soz for this but I am gonna post a couple more questions today which I have found hard..but I'll go one by one
Prove:
(1-cos(x))/sin(x) = tan(x/2)
My working out so far:
(1/sin(x))-(cos(x)/sin(x))
=cosec(x)-cot(x)
but that leads to nothing..and I can't see any other way.

Paradoxica · Apr 25, 2016

Rathin said:
lol soz for this but I am gonna post a couple more questions today which I have found hard..but I'll go one by one
Prove:
(1-cos(x))/sin(x) = tan(x/2)
My working out so far:
(1/sin(x))-(cos(x)/sin(x))
=cosec(x)-cot(x)
but that leads to nothing..and I can't see any other way.

half angle

Green Yoda · Apr 25, 2016

Paradoxica said:
half angle

It says not to use it..so I have to do it another way

InteGrand · Apr 25, 2016

Rathin said:
lol soz for this but I am gonna post a couple more questions today which I have found hard..but I'll go one by one
Prove:
(1-cos(x))/sin(x) = tan(x/2)
My working out so far:
(1/sin(x))-(cos(x)/sin(x))
=cosec(x)-cot(x)
but that leads to nothing..and I can't see any other way.

Use the identities sin^2 (x/2) = (1/2) (1 - cos(x)) and sin(x) = 2 sin(x/2) cos(x/2). I.e. Half-angle formulas, as Paradoxica alluded to.

(Surely they didn't forbid use of these?)

Green Yoda · Apr 25, 2016

InteGrand said:
Use the identities sin^2 (x/2) = (1/2) (1 - cos(x)) and sin(x) = 2 sin(x/2) cos(x/2). I.e. Half-angle formulas, as Paradoxica alluded to.

(Surely they didn't forbid use of these?)

Haven't coved half angle in class yet..
also I am aware that sin^2(x)=1-cos^2(x)
but how does sin^2*x/2)=1/2*(1-cos(x))?

KingOfActing · Apr 25, 2016

Expand cos(2x), write it in terms of just sin^2(x), then just replace x with x/2

Edit: sorry for lack of LaTeX I'm using Tapatalk or whatever and it doesn't render LaTeX + it's a pain to type on my phone

leehuan · Apr 26, 2016

Rathin said:
Haven't coved half angle in class yet..
also I am aware that sin^2(x)=1-cos^2(x)
but how does sin^2*x/2)=1/2*(1-cos(x))?

$Don't use THESE half angle identities$: \\ \sin{\frac{\theta}{2}}=\pm \sqrt{\frac{1-\cos{\theta}}{2}}\\$They're outside the syllabus$

$$Just manipulate those double angle identities that you DO know$:\\ \cos{2x}=1-2\sin^2{x} \Leftrightarrow \cos{x}=1-2\sin^2{\frac{x}{2}}$

$$Proof is honestly easy. Let $u=2x$

Green Yoda · Apr 26, 2016

for the question
prove:
(sin(x)+1-cos(x))/sin(x)-1+cos(x) = (1+tan(x/2))/1-tan(x/2) w
would I do the same thing?

InteGrand · Apr 26, 2016

Rathin said:
for the question
prove:
(sin(x)+1-cos(x))/sin(x)-1+cos(x) = (1+tan(x/2))/1-tan(x/2) w
would I do the same thing?

You could try using t-formulas.

Green Yoda · Apr 26, 2016

InteGrand said:
You could try using t-formulas.

haven't learnt that yet..should be learning when school starts. This one is under special angle formulas exercise so It can be done without?

InteGrand · Apr 26, 2016

Rathin said:
haven't learnt that yet..should be learning when school starts. This one is under special angle formulas exercise so It can be done without?

Yeah, you can do it via half-angle formulas (convert sin(x) and stuff into trig. functions with x/2 instead of x).

Green Yoda · Apr 26, 2016

InteGrand said:
Yeah, you can do it via half-angle formulas (convert sin(x) and stuff into trig. functions with x/2 instead of x).

I have tried learning the t-formula via YouTube and I am curious how would you do this question by using t formula?

InteGrand · Apr 26, 2016

Rathin said:
I have tried learning the t-formula via YouTube and I am curious how would you do this question by using t formula?

Using t-formulas, the RHS is (1+t)/(1-t), provided t =/= 1. You can also express the LHS in terms of t using the t-formulas, and show it simplifies to (1+t)/(1-t).

Green Yoda · Apr 26, 2016

LHS:
((2t/1+t^2)+1-(1-t^2/1+t^2))/(2t/1+t^2)-1+(1-t^2/1+t^2) yeah??

InteGrand · Apr 26, 2016

Rathin said:
LHS:
((2t/1+t^2)+1-(1-t^2/1+t^2))/(2t/1+t^2)-1+(1-t^2/1+t^2) yeah??

Yeah. Then you can simplify that to get it down to what the RHS is.

Green Yoda · Apr 26, 2016

InteGrand said:
Yeah. Then you can simplify that to get it down to what the RHS is.

alright cool thanks

Green Yoda · Apr 26, 2016

prove
cot(x+y)=(cot(x)cot(y)-1)/cot(x)+cot(y)

InteGrand · Apr 26, 2016

Rathin said:
prove
cot(x+y)=(cot(x)cot(y)-1)/cot(x)+cot(y)

This is the compound angle formula for cot. It can be derived from the corresponding formula for tan.

Green Yoda · Apr 26, 2016

InteGrand said:
This is the compound angle formula for cot. It can be derived from the corresponding formula for tan.

so just switch the tan one around?

Prelim 2016 Maths Help Thread (3 Viewers)

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