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Can anyone help me with this trig question plz? (1 Viewer)

CJ251

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Hi everyone. Hope ur all goin gud. Not long for the HSC.
Well i got this question for trig. show that if 0 < x < pie on four
then cos2x>2sin squared x minus one?

I cant write maths things here. thanks heaps if u cud help me.
 
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CJ251

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Hi everyone. Hope ur all goin gud. Not long for the HSC.
Well i got this question for trig. show that if 0 < x<pie on four
then cos2x>2sin squared x minus one?

I cant write maths things here. thanks heaps if u cud help me.[/QUOTE]
 

CJ251

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SoulSearcher said:
You can either use 2sin^2 x - 1 or 2sin2x - 1 for notation like that.

As for your question, well I don't get "show that if 0 then".
Thanks the question came out wrong.
heres the question hope i get it right here.

Show that if 0 < x < pie on 4, then cosx > 2sin^2 x - 1
 

SoulSearcher

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Well you can draw both graphs on the same set of axes and that should show that cosx > 2sin2x -1 for 0 < x < pi/4.

An alternate way is to covert 2sin2x -1 into -cos2x, and since cos2x is positive or 0 for the domain 0 < x < pi/4, -cos2x would be negative in that domain, and since cosx is positive for the domain 0 < x < pi/4, then cosx > -cos2x and hence that cosx > 2sin2x -1 for 0 < x < pi/4.
 
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BIRUNI

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instead showing cosx > 2sin^2 x - 1 you can show 2sin^x-1-cosx<0
so -2cos(3x/2)cos(x/2)<0

cos(3x/2)cos(x/2)<0 obviously when 0<x<pi/4 cos(3x/2) and cos(x/2) are bigger than zero so their addition namely cos(3x/2)cos(x/2) is bigger than zero and it is proven
there are so many other alternative ways let me see if i can type them later
 

BIRUNI

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method 2: x is between o and pi/4 then cosx is between 0.7071... and 1

for x between o and pi/4 sin x is between o and 0.7971... so 2sin^2x-1 is between o and -1
from these two results it is obvious that cosx>2sin^x-1
 
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BIRUNI

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method3: 2sin^x-1=-cos2x
for x between o and pi/4 cosx is between 1 and 0.7071..
for x between o and pi/4 cos2x is betwwen 1 and 0.3826.. so -cos2x is between -1 and -0.3826.. hence from these two cosx>-cos2x
or you could alternatively say that cosx+cos2x is obviously biiger than zero so the inequality holds
 

BIRUNI

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are these enough?

but as soulsearcher mentioned, the simplest and quickes way is graphing.
 

CJ251

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Sweet. I get it. Thanks heaps. I appreciate it.
Im not very good at 3 unit so i'll definitely ask more questions. lol. But i'll always try.
Thanks everyone, good luc studyin and hope u could help me l8r.
 

CJ251

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Hey im back. I got another question. I HATE TRIG.
Okay.
Find all the angles x with 0 < or equal x < or equal to 2pie for which sinx + cosx = 1
Once again thank you for helping me.
 

CJ251

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Wow that was quick. Thanks heaps. Your the best soulsearcher.
 

BIRUNI

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there are so many ways such as t formula, subsidary angles, squaring boths sides and etc but I advise auxilary method
you can memorize this
asinx+bcosx=rsin(x+alpha)
asinx-bcosx=rsin(x-alpha)
acosx-bsinx=rcos(x+alpha)
acosx+bsinx=rcos(x-alpha)

r^2=a^2+b^2 but r>0
alpha=tan^(-1)(b/a)
 
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You can use the auxiliary method, you can change sinx+cosx=1 into sqrt{2}sin(x+pi/4)=1, which then you solve for x, a much quicker method
 

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CJ251 said:
Hey im back. I got another question. I HATE TRIG.
Okay.
Find all the angles x with 0 < or equal x < or equal to 2pie for which sinx + cosx = 1
Once again thank you for helping me.
- use t-formulae sinx=2t(1+t2) and cosx=(1-t2)/(1+t2)
remeber to test pi as a soln because if pi is an answer it wont show in your results when using the t formulae

- or transformations, let sinx+cosx= Rsin(x+@)
= Rsinxcos@+Rsin@cosx
then Rsin@=1 (eqtn 1)
then Rcos@=1 (eqtn 2)
from 1, we get sin@=1/R and from 2, we get cos@=1/R
from these we get tan@=1, so @=pi/4
squaring 1 and 2, then adding we get R2=2, so R=rt2
then sinx+cosx=rt2sin(x+pi/4)=1
then solving the underlined
sin(x+pi/4)=1/rt2
then x+pi/4=pi/4 or x+pi/4=3pi/4
so x=0 or x=2pi or x=pi/2

EDIT: way too slow
 

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BIRUNI said:
there are so many ways such as t formula, subsidary angles, squaring boths sides and etc but I advise auxilary method
you can memorize this
asinx+bcosx=rsin(x+alpha)
asinx-bcosx=rsin(x-alpha)
acosx-bsinx=rcos(x+alpha)
acosx+bsinx=rcos(x-alpha)

r^2=a^2+b^2 but r>0
alpha=tan^(-1)(b/a)
You also need to know how to derive these results, as shown by onebytwo in the previous post.
 

CJ251

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Sweet thanks. Okay jus a stupid question. For sin (theta - alfa) = 1/rt2
it equlas pi/4, 3pie/4, 9pi/4, 11pi/4,.......
Um how do we actually come to these results. I thought it was jus the first two but i cudnt get the rest. :(
 

followme

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The general formula

([FONT=宋体]θ-[/FONT]α)= πn + (-1)<sup>n</sup>sin<sup>-1</sup>(1/√2)
where n is an integer
n=0 ([FONT=宋体]θ-[/FONT]α)= π/4
n=1 ([FONT=宋体]θ-[/FONT]α)=3π/4...

ususally the question will indicate a range eg 0≤x≤2pi, or it will ask u to find teh general solution.
 
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