• Congratulations to the Class of 2024 on your results!
    Let us know how you went here
    Got a question about your uni preferences? Ask us here

Question about Auxillary Method - Trig (1 Viewer)

Smilebuffalo

Member
Joined
Jun 9, 2008
Messages
89
Location
Fairfield West
Gender
Male
HSC
2010
When looking at past HSC solutions the answer always derives how to transform asinx + bcosx into Rsin(x + $)

I was wondering if we have to derive it as well, or can we simply use the formula for finding R and $ using:

R = sqrt(a^2 + b^2) and tan $ = b/a


???
 

addikaye03

The A-Team
Joined
Nov 16, 2006
Messages
1,267
Location
Albury-Wodonga, NSW
Gender
Male
HSC
2008
When looking at past HSC solutions the answer always derives how to transform asinx + bcosx into Rsin(x + $)

I was wondering if we have to derive it as well, or can we simply use the formula for finding R and $ using:

R = sqrt(a^2 + b^2) and tan $ = b/a


???
Just have to use the formula i believe
 

biopia

WestSyd-UNSW3x/week
Joined
Nov 12, 2008
Messages
341
Gender
Male
HSC
2009
I find it better to derive it as you go.
For example: Express sinθ +√3cosθ in the form of Rsin(θ-α)

First, Rsin(θ-α) = Rsinθcosα - Rcosθsinα

Equating gives;
sinθ = Rsinθcosα ⇒ 1 = Rcosα [divide both sides by sinθ]
Similarly,
√3cosθ = Rcosθsinα ⇒ √3 = Rsinα

So we have:
Rsinα = √3
Rcosα = 1
By division, it is clear that,
tanα = √3
α = π/3

Use the formula part for R
1² + √3² = R² ⇒ R = 2

Therefore:
sinθ +√3cosθ = 2sin(θ-π/3)

I have always done it this way. It shows the markers you aren't just wrote learning.
I suppose if you use the formula, it's ok too. I just thought I'd contribute the derivation.
=]
 
Joined
Jan 26, 2009
Messages
270
Gender
Male
HSC
2009
just learn the formula, you have 1000 other things to remember, biopia - you machine.
 

madsam

God among men
Joined
Feb 16, 2008
Messages
250
Gender
Male
HSC
2009
Express sinθ +√3cosθ in the form of Rsin(θ+@)
--> 2(1/2 sinθ + √3/2cosθ)
I find it easier to simply force in an R value

then
1/2 = cos@

√3/2 = sin@

Draw the triangle, and you get @ = pi/3

--> 2sin(θ+pi/3)
 

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

Top