MedVision ad

Trigonometry: Auxillary Rule (1 Viewer)

munkaii

Member
Joined
Jul 8, 2004
Messages
99
Gender
Male
HSC
2006
Just a question about the expression:

asinx+bsinx=c=rsin(x+alpha)

for this eqn.

r= (aa + bb)^1/2

tan-1 x = b/a <<<<<<< is this the same expression for both sine and cos rule? or is it different?
 

Slidey

But pieces of what?
Joined
Jun 12, 2004
Messages
6,600
Gender
Male
HSC
2005
Why not just derive it each time? It's quick, and there's less chance of error that way:

Given:

asinx+bcosx=c

You could go:
asinx+bcosx=R(sinxcos@+cosxsin@)=Rsin(x+@)
Equate:
Rcos@=a
Rsin@=b
R^2(cos^2(@)+sin^2(@))=a^2+b^2
.'. R=sqrt(a^2+b^2)
But also:
Rsin@/Rcos@=b/a
tan@=b/a
So tan<sup>-1</sup>(b/a)=@ (QUITE different to what you had!)

Suppose you instead went:
asinx+bcosx=R(cosxcos@+sinxsin@)=Rcos(x-@)
Equate:
Rcos@=a
Rsin@=b
tan@=b/a (Still)

That is: yes, arctan(b/a)=@ works for any of the 4 identities you use.
 

Will Hunting

Member
Joined
Oct 22, 2004
Messages
214
Location
Carlton
Gender
Male
HSC
2005
The above method is called the subsidiary angle method, and is sometimes called the auxiliary angle method because the angle introduced ( i.e. &alpha; ) is secondary to the angle you're solving for (i.e. x).


munkaii said:
is this the same expression for both sine and cos rule? or is it different?
It's different, although memorising the methods for each situation is not at all difficult. Here's how it's done:

When the LHS begins with an expression in sin&Theta;, signs are the same for both equations i.e.

asin&Theta; + bcos&Theta; = c = rsin( &Theta; + &alpha; )
(There is a plus sign in both equations)

asin&Theta; - bcos&Theta; = c = rsin( &Theta; - &alpha; )
(There is a minus sign in both equations)

Conversely, when the LHS begins with an expression in cos&Theta;, signs are contrary, or they alternate from one side to the other i.e.

acos&Theta; + bsin&Theta; = c = rcos( &Theta; - &alpha; )
(There is a plus sign on the left and a minus sign on the right)

acos&Theta; - bsin&Theta; = c = rcos( &Theta; + &alpha; )
(There is a minus sign on the left and a plus sign on the right)

You've probably recognised that these results exhibit the same features as results for sums and differences of angles. In actual fact, the processes involved are exactly the same, as Slide Rule has demonstrated above, so if you're up to speed with sums and differences, you're sure to shred this up too ;) Good luck!
 
Last edited:

munkaii

Member
Joined
Jul 8, 2004
Messages
99
Gender
Male
HSC
2006
ah. i knew the sums and differences connection.
Just wasnt sure about the tan alpha part.

ive got a nother q while im at it.
Express sin theta in terms of sin theta/2 and cos theta/2.< basic enoguh i can do that.

Given t= tan theta/2, show that sin theta = 2t /1+t^2
 

rama_v

Active Member
Joined
Oct 22, 2004
Messages
1,151
Location
Western Sydney
Gender
Male
HSC
2005
munkaii said:
ive got a nother q while im at it.
Express sin theta in terms of sin theta/2 and cos theta/2.< basic enoguh i can do that.

Given t= tan theta/2, show that sin theta = 2t /1+t^2
Its in the Fitzpatrik book if you want to see it. The way to do it is draw up a right angled triangle with tan@/2 as the acute angle. Then from there the opposite side is t and the adjacent side is 1. so tan @/2 = t , sin@/2 = t/sqrt(1+t^2) , cos @/2 = 1/sqrt(1+t^2) .

You know that sin2@ = 2sin@cos@ so therefore sin@ = 2sin(@/2)cos(@/2)
just plug in the stuff you've derived above and you get 2 x t/sqrt(1+t^2) x 1/sqrt(1+t^2)

which equals 2t/1+t^2
 

m_isk

Member
Joined
Apr 22, 2004
Messages
158
Gender
Undisclosed
HSC
N/A
munkaii said:
ah. i knew the sums and differences connection.
Just wasnt sure about the tan alpha part.

ive got a nother q while im at it.
Express sin theta in terms of sin theta/2 and cos theta/2.< basic enoguh i can do that.

Given t= tan theta/2, show that sin theta = 2t /1+t^2
(i) sin@=2sin(@/2)cos(@/2)

(ii) given t =tan(@/2),
well, tan(@) = tan(@/2+@/2) =2tan(@/2) / 1-tan(@/2)^2
=2t/1+t^2 given tan(@/2)=t
then, you should draw a right angled triangle where tan(@) = is the crap we said..then using pythagoras you will find that the third side, which is the hypotenuse, is 1+t^2..
sin(@) equals opposite/hypotenuse =2t/1+t^2
Note: you should be able to find this in any 3u book under the "t" method
 

m_isk

Member
Joined
Apr 22, 2004
Messages
158
Gender
Undisclosed
HSC
N/A
great timing rama!! :D (i cant believe this..that's the second time in 20 mins :confused:
 

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,390
Gender
Male
HSC
2006
The way I was taught to derive the t results of sinθ was without the reference of a right-angled triangle:

Since:
sin2A = 2sinA.cosA
Let A = θ/2
.: sinθ = 2sin(θ/2).cos(θ/2)

Make sin²(θ/2) + cos²(θ/2) as the denominator of 2sin(θ/2).cos(θ/2)
(since sin²(θ/2) + cos²(θ/2) = 1)

.: sinθ = ____2sin(θ/2).cos(θ/2)____
-------------> sin²(θ/2) + cos²(θ/2)

Divide the numerator and denominator by cos²(θ/2)
(since the numerator and denominator have a common denominator, this denominator would normally cancel out)

.: sinθ = ____2sin(θ/2).cos(θ/2)____ ÷ ____sin²(θ/2) + cos²(θ/2)___
...............................cos²(θ/2)...................................cos²(θ/2)........................


The first term should simplify to 2tan(θ/2):

.: sinθ = 2tan(θ/2) ÷ ____sin²(θ/2) + cos²(θ/2)___
...................................................cos²(θ/2).......................................................

The second term should be split into separate fractions and simplified:
.:sinθ = 2tan(θ/2) ÷ [____sin²(θ/2)____ + ____cos²(θ/2)___]
................................[........cos²(θ/2)....................cos²(θ/2)......].......................


Simplify the two fractions and you get:

sin θ = 2tan(θ/2) ÷ [tan²(θ/2) + 1]

.: sin θ = ____2tan(θ/2)____
...................[tan²(θ/2) + 1].....................................................................................

Given that t = tan(θ/2)

.: sinθ = ___2t___
.................t² + 1......................................................................................................

How's that?

[IGNORE the dotted lines or elipses. They're there because I can't do more than 2 space bars that will show on the post and I didn't want to use the slash as a fraction line because that will make it confusing especially with complicated fractions]
 
Last edited:

JamiL

Member
Joined
Jan 31, 2004
Messages
704
Location
in the northen hemisphere (who saids australia is
Gender
Male
HSC
2005
velox said:
sometimes in exams they get you to derive it. So i would know how to derive it if i were u.
yes u HAVE 2 no how 2 derive it, as u said they can ask u. but noing how 2 derive it should make it easyer 2 remember. in a case when they say scetch
cos@+root2sin@.
in this case u could derive it but it would be a waste of tym, if u new the formula u can do it in a second. its not a big deal thou
lol
 

munkaii

Member
Joined
Jul 8, 2004
Messages
99
Gender
Male
HSC
2006
Trebla said:
The way I was taught to derive the t results of sinθ was without the reference of a right-angled triangle:

Since:
sin2θ = 2sinθ.cosθ
Let θ = θ/2
.: sinθ = 2sin(θ/2).cos(θ/2)

Make sin²(θ/2) + cos²(θ/2) as the denominator of 2sin(θ/2).cos(θ/2)
(since sin²(θ/2) + cos²(θ/2) = 1)

.: sinθ = ____2sin(θ/2).cos(θ/2)____
-------------> sin²(θ/2) + cos²(θ/2)

Divide the numerator and denominator by cos²(θ/2)
(since the numerator and denominator have a common denominator, this denominator would normally cancel out)

.: sinθ = ____2sin(θ/2).cos(θ/2)____ ÷ ____sin²(θ/2) + cos²(θ/2)___
...............................cos²(θ/2)...................................cos²(θ/2)........................


The first term should simplify to 2tan(θ/2):

.: sinθ = 2tan(θ/2) ÷ ____sin²(θ/2) + cos²(θ/2)___
...................................................cos²(θ/2).......................................................

The second term should be split into separate fractions and simplified:
.:sinθ = 2tan(θ/2) ÷ [____sin²(θ/2)____ + ____cos²(θ/2)___]
................................[........cos²(θ/2)....................cos²(θ/2)......].......................


Simplify the two fractions and you get:

sin θ = 2tan(θ/2) ÷ [tan²(θ/2) + 1]

.: sin θ = ____2tan(θ/2)____
...................[tan²(θ/2) + 1].....................................................................................

Given that t = tan(θ/2)

.: sinθ = ___2t___
.................t² + 1......................................................................................................

How's that?

[IGNORE the dotted lines or elipses. They're there because I can't do more than 2 space bars that will show on the post and I didn't want to use the slash as a fraction line because that will make it confusing especially with complicated fractions]

cheers! i was looking for a way besides triangle method. ta
 

Slidey

But pieces of what?
Joined
Jun 12, 2004
Messages
6,600
Gender
Male
HSC
2005
JamiL said:
in this case u could derive it but it would be a waste of tym, if u new the formula u can do it in a second. its not a big deal thou
lol
If you derive it, "you can do it in a second". :p
 

Will Hunting

Member
Joined
Oct 22, 2004
Messages
214
Location
Carlton
Gender
Male
HSC
2005
Trebla said:
Since:
sin2θ = 2sinθ.cosθ
Let θ = θ/2
.: sinθ = 2sin(θ/2).cos(θ/2)
This should be rephrased,

sin2A = 2sinAcosA, for some A &ne; &Theta;
Let A = &Theta;/2
Then sin&Theta; = 2sin(&Theta;/2)cos(&Theta;/2)

&Theta; = &Theta;/2 implies &Theta; = 0, and only 0

But from the triangle proof, the t results can be seen to hold for &Theta; &ne; 0 aswell.


Trebla said:
this denominator would normally cancel out
It will always cancel out, provided it's added to both the numerator and the denominator of the starting expression.
 

munkaii

Member
Joined
Jul 8, 2004
Messages
99
Gender
Male
HSC
2006
But!

yes but somehow pull a wrong answer and you lose a majority of your marks
 

amandagirgenti

New Member
Joined
Sep 16, 2006
Messages
4
Gender
Female
HSC
2007
Will Hunting said:
The above method is called the subsidiary angle method, and is sometimes called the auxiliary angle method because the angle introduced ( i.e. α ) is secondary to the angle you're solving for (i.e. x).




It's different, although memorising the methods for each situation is not at all difficult. Here's how it's done:

When the LHS begins with an expression in sinΘ, signs are the same for both equations i.e.

asinΘ + bcosΘ = c = rsin( Θ + α )
(There is a plus sign in both equations)

asinΘ - bcosΘ = c = rsin( Θ - α )
(There is a minus sign in both equations)

Conversely, when the LHS begins with an expression in cosΘ, signs are contrary, or they alternate from one side to the other i.e.

acosΘ + bsinΘ = c = rcos( Θ - α )
(There is a plus sign on the left and a minus sign on the right)

acosΘ - bsinΘ = c = rcos( Θ + α )
(There is a minus sign on the left and a plus sign on the right)

You've probably recognised that these results exhibit the same features as results for sums and differences of angles. In actual fact, the processes involved are exactly the same, as Slide Rule has demonstrated above, so if you're up to speed with sums and differences, you're sure to shred this up too ;) Good luck!
thank u soo much 4 this explanation... i was wondering why wen the expression begins with cos, the signs on the left and right are opposite

thanx agenn
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top