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Title: Limits Post by Braincramps on May 16th, 2004, 12:25pm Let y = x1/ [smiley=surd.gif](1-x). Find the limit of y/(1-y) as x [smiley=longrightarrow.gif] 1-. |
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Title: Re: Limits Post by THUDandBLUNDER on May 16th, 2004, 1:38pm Have you attempted it? If so, how far did you get? :-X |
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Title: Re: Limits Post by Benoit_Mandelbrot on May 17th, 2004, 9:21am The answer is :: [hide]infinity. Here's why. We need to substitute into the fraction so the limit can be evaluated. Because 1-x is greater than zero when x goes to one from the left, the square root of 1-1 is zero, and because that limit would be positive, then 1/sqrt(1-x) approaches infinity. 1^infinity is one. In the denominator, we get a negative number because x goes to one from the left. So we factor the negative into the denominator get 1/(1-u) as u goes to 1 from the left. The limit is infinity. [/hide]:: |
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Title: Re: Limits Post by Icarus on May 17th, 2004, 6:17pm 1[supinfty] need not be 1. For instance, limx[to]0 (ex)1/x = e |
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Title: Re: Limits Post by TenaliRaman on May 17th, 2004, 6:50pm QED!! ;D (put the graph into words and using the definition of limits, i think we can finish it off quite easily!) (The white line is y and the red is y/1-y) |
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Title: Re: Limits Post by Benoit_Mandelbrot on May 18th, 2004, 6:03am True, Icarus, but in this case, the x-es don't cancel out, so you can't do direct substitution. In the case of the problem, 1^[infty] would be one. |
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Title: Re: Limits Post by Icarus on May 18th, 2004, 10:05pm on 05/18/04 at 06:03:29, Benoit_Mandelbrot wrote:
Perhaps, but you have to prove it. |
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Title: Re: Limits Post by THUDandBLUNDER on May 19th, 2004, 4:37am on 05/17/04 at 18:50:52, TenaliRaman wrote:
Oh, you use Graphmatica, too! Try LIM Sin(1/x) x->0 |
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Title: Re: Limits Post by Barukh on May 19th, 2004, 5:39am What’s wrong with this? Substitute: x = 1 – z, and we seek the limit when z [to] 0+. ln(y) = ln[ (1-z) 1/[sqrt]z ] = z-1/2 ln(1-z) = z-1/2 ( -z - z2/2 - z3/3 - ...) = - (z1/2 + z3/2/2 + z5/2/3 + ...) [to] 0 when z [to] 0+. Therefore y [to] 1-. ??? |
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Title: Re: Limits Post by Benoit_Mandelbrot on May 19th, 2004, 6:04am Nice .gif Barukh! How did you make that or get that? How would I make something like that, like a supernova in the correct size? |
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Title: Re: Limits Post by towr on May 19th, 2004, 6:05am on 05/19/04 at 05:39:32, Barukh wrote:
so that would go to [infty] then.. |
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Title: Re: Limits Post by Barukh on May 19th, 2004, 7:42am on 05/19/04 at 06:04:10, Benoit_Mandelbrot wrote:
Yes, it's nice, but it’s not mine – you should ask TenaliRaman ;D on 05/19/04 at 06:05:53, towr wrote:
So, what's the flaw in my derivation? Or, are you saying that's not enough to establish the value of y/(1-y)? |
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Title: Re: Limits Post by towr on May 19th, 2004, 8:53am on 05/19/04 at 07:42:52, Barukh wrote:
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Title: Re: Limits Post by TenaliRaman on May 21st, 2004, 10:45am on 05/19/04 at 04:37:56, THUDandBLUNDER wrote:
finite value <= |1| ;) |
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Title: Re: Limits Post by THUDandBLUNDER on May 23rd, 2004, 1:10pm What is LIM[smiley=surd.gif][x(x + 1)] - x? x -> oo |
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Title: Re: Limits Post by Barukh on May 24th, 2004, 12:06am on 05/23/04 at 13:10:11, THUDandBLUNDER wrote:
[smiley=blacksquare.gif][hide] 1/2. Proof: Let a = [sqrt] [x(x+1)], b = x + 1/2. Then: (b-a)(b+a) = b2 – a2 = 1/4, therefore b – a [to] 0 when x [to] [infty]. [/hide][smiley=blacksquare.gif] |
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Title: Re: Limits Post by TenaliRaman on May 24th, 2004, 11:32am wowee, that's elegant barukh. much pretty straightforward method that i usually use, ::[hide]multiply numerator and denominator by sqrt(x(x+1))+x.note that this is well within the rules since x->oo and hence x!=oo.then divide numerator by x.again well within the rules.then just take x->oo and et voila 1/2[/hide]:: |
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Title: Re: Limits Post by Barukh on May 24th, 2004, 11:08pm on 05/24/04 at 11:32:14, TenaliRaman wrote:
Thanks. Quote:
I'm having difficulty to understand your method. The first operation seems OK, but after the second one - [hide]dividing numerator by x[/hide] - you are dealing with another limit. Or did you mean: [hide]dividing both numerator and denominator by x[/hide]? |
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Title: Re: Limits Post by Sir Col on May 25th, 2004, 2:32am I think that's what he meant. In which case... L = x/([sqrt][x(x+1)]+x) = 1/([sqrt][(x+1)/x]+1) As x[to][infty], (x+1)/x[to]1, so L[to]1/2. But as TenaliRaman said, what an elegant method, Barukh! *round of applause smilie* |
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Title: Re: Limits Post by Barukh on May 25th, 2004, 4:25am on 05/25/04 at 02:32:57, Sir Col wrote:
Really nice! :D |
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Title: Re: Limits Post by THUDandBLUNDER on May 31st, 2004, 7:05pm If f(x,y)= x4logexy find LIM f(x,y) as (x,y)->(0,0) |
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Title: Re: Limits Post by Eigenray on May 31st, 2004, 9:32pm on 05/31/04 at 19:05:47, THUDandBLUNDER wrote:
Try [hide]letting (x,y)->(0,0) along the curve y=e^(-1/x^n) for n=3,4,5[/hide]. |
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