#upper limit

A mental health condition can be overwhelming for so many people who venture out, but it can be managed, just find your new upper limit.

Whether you have PTSD, or another mental health condition, the world can be overwhelming but it can be managed, just find your new upper limit.Tweet With so much going on in our world today, I find it’s easy to find myself thinking; “the world has lost all of its compassion.” But is this really true? While it may be tempting to hold this belief, it is far from the truth. Sometimes, all we need…

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حدود پایین و بالای دنباله

تعریف ۱:

فرض کنید $a_n$ یک دنباله‌ای از اعداد حقیقی و از بالا کراندار باشد. دنبالۀ $M_n$ را چنین تعریف می کنیم

\beginalign*

M_n=\sup\seta_n,a_n+1,\cdots

\endalign*

به آسانی دیده می شود که دنبالۀ $M_n$ نزولی است و بنابراین $\lim_n\to\inftyM_n$ موجود است.

$\lim_n\to\inftyM_n$ را حد بالای $a_n$ می نامیم و با $\varlimsup_n\to\inftya_n$ یا $\lim_k\to\infty\sup_n\ge ka_n$ نمایش می دهیم. مثلاً، اگر $a_n=(-1)^n$ آنگاه $\varlimsup_n\to\inftya_n=1$ و اگر $a_n=-n$ آنگاه $\varlimsup_n\to\inftya_n=-\infty$.

  تعریف۲:

اگر $a_n$ یک دنباله‌ای از اعداد حقیقی و از بالا کراندار نباشد، تعریف می کنیم :

\beginalign*

\varlimsup_n\to\inftya_n=\infty.

\endalign*

قضیه۱:

اگر $a_n$ یک دنباله‌ای از بالا کراندار و $\lim_n\to\inftya_n$ موجود باشد، آنگاه:

\beginalign*

\varlimsup_n\to\inftya_n=\lim_n\to\inftya_n.

\endalign*

  تعریف۳:

فرض کنید $a_n$ یک دنباله‌ای از اعداد حقیقی که از پایین کراندار است و

\beginalign*

m_n=\inf\seta_n,a_n+1,\cdots

\endalign*

دنبالۀ $m_n$ صعودی است و لهذا، $\lim_n\to\inftym_n$ موجود است. $\lim_n\to\inftym_n$ را حد پایین $a_n$ می نامیم و با $\varliminf_n\to\inftya_n$ یا $\lim_k\to\infty\inf_n\ge ka_n$ نمایش می دهیم.

  تعریف۴:

اگر $a_n$ یک دنباله‌ای از اعداد حقیقی باشد که از پایین کراندار نباشد، تعریف می کنیم :

\beginalign*

\varliminf_n\to\inftya_n=-\infty.

\endalign*

  احکام زیر نتایج مستقیم تعاریف حدود بالا و پایین هستند.

  نتیجۀ۱:

اگر $a_n$ از پایین کراندار و $\lim_n\to\inftya_n$ موجود باشد آنگاه، $\varliminf_n\to\inftya_n=\lim_n\to\inftya_n$.

  نتیجۀ۲:

اگر $a_n$ یک دنباله‌ای از اعداد حقیقی باشد آنگاه

\beginalign*

\varliminf_n\to\inftya_n\le \varlimsup_n\to\inftya_n.

\endalign*

  قضیه۲:

اگر $a_n$ یک دنباله‌ای از اعداد حقیقی باشد بطوریکه

\beginalign*

\varliminf_n\to\inftya_n= \varlimsup_n\to\inftya_n=a.

\endalign*

آنگاه $\lim_n\to\inftya_n=a$

  قضیه۳:

فرض کنید $a_n$ و $b_n$ دنباله‌های کراندار از اعداد حقیقی باشند. در اینصورت

اگر همواره $a_n\le b_n$، آنگاه \beginalign* \varlimsup_n\to\inftya_n\le \varlimsup_n\to\inftyb_n\qquad,\qquad \varliminf_n\to\inftya_n\le \varliminf_n\to\inftyb_n \endalign*

\beginalign* \varlimsup_n\to\infty(a_n+b_n)\le \varlimsup_n\to\inftya_n+\varlimsup_n\to\inftyb_n \endalign*

\beginalign* \varliminf_n\to\infty(a_n+b_n)\ge \varliminf_n\to\inftya_n+\varliminf_n\to\inftyb_n \endalign*

قضیه۴:

فرض کنید $a\in\mathbb R$. شرط لازم و کافی برای آنکه $\varlimsup_n\to\inftya_n=a$ باشد آن است که:

به ازای هر $\varepsilon>0$، عدد طبیعی مانند $N$ موجود باشد بطوریکه به ازای هر عدد طبیعی $n$ اگر $n\ge N$ آنگاه $a_n<a+\varepsilon$.

به ازای هر $\varepsilon>0$ و هر عدد طبیعی $N$ عدد طبیعی مانند$n$ موجود باشد بطوریکه $n\ge N$ و $a_n>a-\varepsilon$.

  قضیه۵:

شرط لازم و کافی برای آنکه $\varliminf_n\to\inftya_n=a$ ($a\in\mathbb R$) آن است که:

به ازای هر $\varepsilon>0$، عدد طبیعی مانند $N$ موجود باشد بطوریکه به ازای هر عدد طبیعی $n$ اگر $n\ge N$ آنگاه $a-\varepsilon<a_n$.

به ازای هر $\varepsilon>0$ و هر عدد طبیعی $N$ عدد طبیعی مانند$n$ موجود باشد بطوریکه $n\ge N$ و $a_n<a+\varepsilon$.

قضیه۶:

هر دنبالۀ کراندار از اعداد حقیقی دارای زیر دنباله‌ای همگراست.

  قضیه۷(شرط کوشی):

شرط لازم و کافی برای آنکه دنبالۀ$a_n$ از اعداد حقیقی همگرا باشد آن است که:

به ازای هر $\varepsilon>0$ عددی طبیعی مانند $N$ موجود باشد بطوریکه به ازای هر دو عدد طبیعی$m$ و $n$ اگر $m\ge N$ و $n\ge N$ آنگاه

\beginalign*

\absa_m-a_n<\varepsilon

Did you know that everyone has a success ceiling??  These are also called upper limits, or limiting beliefs. 

I am currently breaking through a very strong limiting belief I have had since I was 21 years old and has shaped my life (not necessarily for the good).  Mine is that I have felt the need to be taken care of, that there is a man out there who will just take care of me (and now my child) and I don’t have to worry about my goals or paying my own bills.  This is just for me (so if you do have someone who does that for you, seriously super awesome) but even if I did have a man who cared about me enough to help support us, I don’t ever want to be in the situation where I have to depend on someone and be stuck.  

My affirmation for today is “In the past, I had a deep feeling to be taken care of and depend on a man, but now, I can take care of myself and Harry, trust this journey, and live in my empowerment that I can actually do this.

To humans, they agree on an upper limit. With salaries for managers it does not work.

Chapter 3 complete! Check out today's brand new pages of Upper Limit now

New pages of my webcomic Upper Limit are out now.

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