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simple trig question (1 Viewer)
- Thread starter d3adgurL
- Start date
-=«MÄLÅÇhïtÊ»=-
Gender: MALE!!!
a) cos 2x = cosx
ok this one's abit tricky. but if u know how to start it off, its pretty simple. So my advice is to practice alotta questions, so in an exam you'll recognise this type and know how to start it off.
cos2x = cosx
2(cosx)^2 - 1 = cosx
2(cosx)^2 - cosx -1 = 0
let m = cosx
2m^2 - m - 1 = 0
(m-1)(2m+1) = 0
m = 1, -1/2
So cosx = 1, -1/2
therefore x = 0, 360, 120, 240 degrees
b) cosx + (root)3sinx = 2
Anytime you see a question like cos x + sinx = constant
it means you either use t-rules or subsidiary method.
I'll use t-rules this time
cosx = (1-t^2)/(1+t^2)
sin x = 2t/(1+t^2)
So
(1-t^2)/(1+t^2) + [2sqrt(3)t]/(1+t^2) = 2
[1-t^2 + 2sqrt(3)t]/(1+t^2) = 2
Simplifying gives you
3t^2 - 2sqrt(3)t + 1 = 0
Use quadratic formula to get
t = [sqrt(3)]/3
tan(x/2) = [sqrt(3)]/3
x/2 = 30, 180
Therefore x = 60, 360 degrees
ok this one's abit tricky. but if u know how to start it off, its pretty simple. So my advice is to practice alotta questions, so in an exam you'll recognise this type and know how to start it off.
cos2x = cosx
2(cosx)^2 - 1 = cosx
2(cosx)^2 - cosx -1 = 0
let m = cosx
2m^2 - m - 1 = 0
(m-1)(2m+1) = 0
m = 1, -1/2
So cosx = 1, -1/2
therefore x = 0, 360, 120, 240 degrees
b) cosx + (root)3sinx = 2
Anytime you see a question like cos x + sinx = constant
it means you either use t-rules or subsidiary method.
I'll use t-rules this time
cosx = (1-t^2)/(1+t^2)
sin x = 2t/(1+t^2)
So
(1-t^2)/(1+t^2) + [2sqrt(3)t]/(1+t^2) = 2
[1-t^2 + 2sqrt(3)t]/(1+t^2) = 2
Simplifying gives you
3t^2 - 2sqrt(3)t + 1 = 0
Use quadratic formula to get
t = [sqrt(3)]/3
tan(x/2) = [sqrt(3)]/3
x/2 = 30, 180
Therefore x = 60, 360 degrees
ezzy85
hmm...yeah.....
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and using the Trig transformations:
cos x + (root)3 sin x = 2 can be written as Rsin(x+a)
you have to find a and R.
expanding Rsin(x+a) you get:
Rsinx cosa+ Rcosx sina = 2
so Rcosa = (root)3 ----- 1
Rsina = 1 ----- 2
square both sides and then add them:
R<sup>2</sup> (cos<sup>2</sup>a + sin<sup>2</sup>a )= 3+1
but cos<sup>2</sup>a + sin<sup>2</sup>a = 1
so R<sup>2</sup> =4
R = 2
sub R back into either equation 1 or 2:
2sin a = 1
sin a = 1/2
a = 30, 150
so 2sin(x+30) = 2
sin(x+30) = 1
x+30 = 90
x = 60
x = 360 doesnt work.
im only getting x = 60, are there any others?
cos x + (root)3 sin x = 2 can be written as Rsin(x+a)
you have to find a and R.
expanding Rsin(x+a) you get:
Rsinx cosa+ Rcosx sina = 2
so Rcosa = (root)3 ----- 1
Rsina = 1 ----- 2
square both sides and then add them:
R<sup>2</sup> (cos<sup>2</sup>a + sin<sup>2</sup>a )= 3+1
but cos<sup>2</sup>a + sin<sup>2</sup>a = 1
so R<sup>2</sup> =4
R = 2
sub R back into either equation 1 or 2:
2sin a = 1
sin a = 1/2
a = 30, 150
so 2sin(x+30) = 2
sin(x+30) = 1
x+30 = 90
x = 60
x = 360 doesnt work.
im only getting x = 60, are there any others?
big_will08
Member
ive been told by my maths teacher at school many, many times but id like to have another opinion on this!
the auxiliary angle method/subsidiary method...
you guys know how you can draw the triangle and use pythagoras without going through all that stuff!? can we do that?!
ive been told by my maths teacher not to do that coz they wont mark it or something in the HSC...
any reply would be nice, Thanks!
the auxiliary angle method/subsidiary method...
you guys know how you can draw the triangle and use pythagoras without going through all that stuff!? can we do that?!
ive been told by my maths teacher not to do that coz they wont mark it or something in the HSC...
any reply would be nice, Thanks!
-=«MÄLÅÇhïtÊ»=-
Gender: MALE!!!
yup
dang
4got to add 30 to 180
*brain block*
its this kinda stuff dat screws me up every time
