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May 17th, 2002, 01:28 PM
#1
Thread Starter
Lively Member
Find all the solutions of the Equation...
The question is
a) show that the equation
2sin²x – cosx = 1
can be written as
2cos²x + cosx – 1 =0
b) using your answer to part (a), find all the solutions of the equation
2sin²x – cosx = 1
in the interval 0 < x < 2ð, giving your answer in the terms of ð
the funny ð is supposed to be pi
my working so far to follow
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May 17th, 2002, 01:34 PM
#2
Thread Starter
Lively Member
a)
2sin²x – cosx = 1
2(1- cos²x)-cosx=1
2-2cos²x-cosx=1
2cos²x+ cosx-1=0
b)
(2cosx-1)(cosx+1)
2cosx=1 or cosx=-1
cosx=0.5 or cosx=-1
and now iam comfused… ive got no idea how iam supposed to go on from here
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May 17th, 2002, 01:46 PM
#3
Look at the unit circle. ( cos(theta), sin(theta) )
http://www.math.lsa.umich.edu/~zacht...it_circle.html
When is the cos(theta) = 1/2?
When theta is 60 degrees, or pi/3, and also when theta is 5pi/3.
When is the cos(theta) = -1?
When theta is pi.
Of course, if you're using a calculator, you could use the arccos function, but that would be cheap :P and it probably wouldn't give you both answers for cos(theta) = .5
Every passing hour brings the Solar System forty-three thousand miles closer to Globular Cluster M13 in Hercules -- and still there are some misfits who insist that there is no such thing as progress.
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May 17th, 2002, 01:55 PM
#4
Thread Starter
Lively Member
thank you... ive got my three answers from the diagram... but how is it possible to get the results without having that diagram.... for when i sit an exam... i will not be able to remember that whole diagram...my calculator does not give all 3 answers you are right it only gives 2....
thank you as well
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May 17th, 2002, 02:17 PM
#5
We had to memorize the coordinates. :-)
There are three families. All you really need to know is the first one (pi/x), because the rest are simply sign changes by quadrant.
PI/4 FAMILY: multiples of 45 degrees
pi/4 (root2/2, root2/2) (+,+) 1st quadrant
3pi/4 (- root2/2, root2/2) (-,+) 2nd quadrant
5pi/4 (- root2/2, - root2/2) (-,-) 3rd quadrant
7pi/4 (root2/2, - root2/2) (+,-) 4th quadrant
PI/3 FAMILY multiples of 60 degrees
pi/3 (1/2, root3/2)
2pi/3
4pi/3
5pi/3
PI/6 FAMILY: multiples of 30 degrees
pi/6 (root3/2, 1/2) ....
5pi/6
7pi/6
11pi/6
I had trouble remembering what the multiples were, so I look at it like this:
PI/X
(X-1)PI/X
(X+1)PI/X
(2X-1)PI/X
hope this helps. Sorry, I hated memorizing them too. Maybe your teacher will let you use a sheet on the exam.
Note: when I say root2/2 and root 3/2 I mean sqr(2)/2 and sqr(3)/2, not sqr(2/2) or sqr(3/2).
Last edited by sunburnt; May 17th, 2002 at 02:23 PM.
Every passing hour brings the Solar System forty-three thousand miles closer to Globular Cluster M13 in Hercules -- and still there are some misfits who insist that there is no such thing as progress.
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May 17th, 2002, 02:24 PM
#6
Thread Starter
Lively Member
okey dokey....cheers i will give it a go
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May 18th, 2002, 09:08 AM
#7
Fanatic Member
Originally posted by mjlogan
thank you... ive got my three answers from the diagram... but how is it possible to get the results without having that diagram.... for when i sit an exam... i will not be able to remember that whole diagram...my calculator does not give all 3 answers you are right it only gives 2....
thank you as well
Learn the diagram! There are 4 quadrants on the diagram. All you have to do is remember the quadrants where Sin, Cos, Tan, and All functions are positive. The rest are then negative.
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[VBCODE]Debug.Print Round(((1097) - ((55 ^ 5 + 311 ^ 3 - 11 ^ 3) _
/ (68 ^ 5))) ^ (1 / 7), 13)[/VBCODE]
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May 18th, 2002, 04:22 PM
#8
(2cosx-1)(cosx+1)
2cosx=1 or cosx=-1
cosx=0.5 or cosx=-1
I've been reading the replies for this post, and everything looks a bit complicated... surely if you want to find the x values you just need to do the following: (I'm assuming this is an AS/A level maths exam and u're using a scientific calculator):
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Find the inverse cos of both values to find x, in each case
cosx = 0.5 ==> x = 60degrees
cosx = -1 ==> x = 180degrees
draw the graph of y=cosx between 0 and 360degrees
mark the point at 60degrees where y = 0.5, draw a line if you need across the graph at y = 0.5, and you'll see theres another point on the graph where cosx = 0.5.
As the graph is symmetrical at x = 180degrees, and we know the first value of x is 60.
(180-60) = 120 ==> Therefore 180-120 = 60 degrees
hence 180+120 = 300degrees (or 360-60)
This shows that cos300 is the same value as cos60 (0.5)
So the first solutions are 60,300
Then Inverse cos of -1, you should know = 180degrees. On the cos graph there is only 1 point which reaches -1 between 0 and 360 degrees, so this is the only solution for that part.
All that is left is to convert 60,180,300 into pi*radians
180 = pi radians of course
60 = 180/3.. or pi/3 radians
300 = (60*5) = 5pi/3 radians
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I hope that helps, and at least for me it looks a little more friendly and like the expected answers from the examiners for As/A level exams
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