Makro
Porcupine
I've never done a question like this and I'm a bit confused by the working out that successone gave me.
I don't understand how dividing by 2 makes it become -pi/3 =< x =< pi/3.
Thanks for help in advance
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Series and a trig Q from 2008 Paper (1 Viewer)
- Thread starter Makro
- Start date
Thanks for help in advance
1) Limiting sum formula a/(r-1) where r is between -1 and 1I've never done a question like this and I'm a bit confused by the working out that successone gave me.
I don't understand how dividing by 2 makes it become -pi/3 =< x =< pi/3.
Thanks for help in advance
The ratio of the series is 2x, thus r = 2x
but r has to be between -1 and 1 thus -1 < 2 x < 1
-1/2 < x < 1/2.
2. I assume Solve 2sin2x/3 = 1 for -pi =< x =< pi. is meant to read
2(sin[x/3])^2 = 1
In which case the domain is divided by 3. ie -pi/3 =< x =< pi/3.
because it can only exist within those numbers
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boxhunter91
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|r|<1
.: |2x| <1
-1<2x<1
-1/2 < x <1/2
.: |2x| <1
-1<2x<1
-1/2 < x <1/2
Timothy.Siu
Prophet 9
a limiting sum is one that at infinite terms, it approaches that value.
this means that |r| <1 or the series would just keep getting bigger.
in this series, r=2x
for |2x| < 1
-1<2x<1
-1/2 <2x<1/2
i think that should be the answer
6. a) Solve 2sin^2x/3 = 1 for -pi =< x =< pi.
sin^2 x=3/2
sin x=+-root(3/2)
x=arcsin (+-root(3/2)) ?? (plus the other values)
seems wrong. and i dont remember doing this question like this lol.
this means that |r| <1 or the series would just keep getting bigger.
in this series, r=2x
for |2x| < 1
-1<2x<1
-1/2 <2x<1/2
i think that should be the answer
6. a) Solve 2sin^2x/3 = 1 for -pi =< x =< pi.
sin^2 x=3/2
sin x=+-root(3/2)
x=arcsin (+-root(3/2)) ?? (plus the other values)
seems wrong. and i dont remember doing this question like this lol.
boxhunter91
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- 2009
it is sin^2(x/3)=1.
I got sin x = 1/root 2 so pi/4 etc.
But that is wrong...
I got sin x = 1/root 2 so pi/4 etc.
But that is wrong...
Timothy.Siu
Prophet 9
oh i seeeee now.
i remember doing this last year.
yeah, u have to change the domain i guess, everything else wont fit...sorta
sin^2 (x/3)=1/2
sin (x/3)=+-(1/root2)
then i guess you could just find all the solutions, and delete those that dont fit...
i remember doing this last year.
yeah, u have to change the domain i guess, everything else wont fit...sorta
sin^2 (x/3)=1/2
sin (x/3)=+-(1/root2)
then i guess you could just find all the solutions, and delete those that dont fit...
K
khorne
Guest
sin^2 (x/3) = 1/2 -n <= x <= n
Let u = x/3, -n/3 <= u <= n/3 (adjusting limits)
sin^2 u = 1/2
sin u = +/- 1/rt(2)
Solve for u, then multiply by 3.
Let u = x/3, -n/3 <= u <= n/3 (adjusting limits)
sin^2 u = 1/2
sin u = +/- 1/rt(2)
Solve for u, then multiply by 3.
Makro
Porcupine
It was written as 2sin^2(x/3) = 1, but I think we got that by the end of the discussion.
The bit I don't get is why is it divided by 3? How come it can only exist within those numbers? What makes you think "Oh, I have to divide it by 3" - this is the bit i'm not grasping.
I'm pretty sure I understand the limiting sum question, now. Thank you
K
khorne
Guest
Ok, this is a trig technique called substitution.
If you have a compound angle (eg, divided, added, subtracted....) then, instead of altering the equation, you substitue the angle for something, eg, u.
now, the original limit is -n <= x <= pi
If we say, let u = x/3, this means that U will be a third of x, so the limits have to be reduced, i.e, we do to the limits, what was done to x, to make sure they are the same, i.e -n/3 <= x/3 (or u) <= n/3
If you have a compound angle (eg, divided, added, subtracted....) then, instead of altering the equation, you substitue the angle for something, eg, u.
now, the original limit is -n <= x <= pi
If we say, let u = x/3, this means that U will be a third of x, so the limits have to be reduced, i.e, we do to the limits, what was done to x, to make sure they are the same, i.e -n/3 <= x/3 (or u) <= n/3
Makro
Porcupine
Thanks, guys. Finally got my head around it. Where would I find more of those trig solving questions. I don't ever remember doing an exercise on them and they just sort of seem to pop up here and there and I can never get them first go. Would my best bet be going through past papers? I have the latest SuccessOne book to look through and it looks like there's roughly one in every paper.
ninetypercent
ninety ninety ninety
we had heaps from jones and couchman Book 2. (i think)