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- 5 min or 5 mins? | Learn English - Preply
5 mins" would be appropriate unless you are expressing it as an adjective then use the singular form, as in a five minute break or the ten minute mark However, in scientific writing, the abbreviation for the units is always in the singular form – 5min, 5km, 5kg It might therefore not be considered wrong to use singular forms of abbreviations with plural numbers
- A question regarding independence of $\min {\ {X,Y\}}$ and $X-Y$ when . . .
A question regarding independence of $\min {\ {X,Y\}}$ and $X-Y$ when $X,Y$ follows iid geometric distribution Ask Question Asked 7 years, 9 months ago Modified 5 years, 7 months ago
- How is $\min\ {X,Y\}$ defined for $X, Y$ random variables?
No, $M:=\min\ {X,Y\}$ is a random variable itself that "records" the lowest value of $X,Y$ You do not compare the probabilities but the values of the random variables
- Nl min是气流量的单位么?等于多少立方?_百度知道
Nl min是气流量的单位么?等于多少立方? NL min读作标准升每分钟,意思是20摄氏度,1大气压的标准状况下的流量是每分钟多少升。
- 流量单位:L min与NL min有什么区别,有换算关系吗?_百度知道
2、NL min NL min读作标准升每分钟,意思是20摄氏度,1大气压的标准状况下的流量是每分钟多少升。 体积流量 体积流量(Volume Flowrate)是单位时间里通过过流断面的流体体积,简称流量,以Q表示。 气体体积流量系指单位时间输送管道中流过的气体体积。
- PDF of $\\min$ and $\\max$ of $n$ iid random variables
PDF of min and max of n iid random variables Ask Question Asked 5 years, 9 months ago Modified 5 years, 9 months ago
- real analysis - What do $\min { [f,g]}$ and $\max { [f,g]}$ mean in my . . .
I understand the basics of continuity and algebra of continuity of limits So I add the picture of the proof such that it is in the book of Real Analysis I would really appreciate if someone could explain it to me as simple as possible I'm struggling to understand it, What do $\min { [f,g]}$ and $\max { [f,g]}$ mean? Thank you
- probability distributions - Finding the density for $\min\ {X, Y . . .
E g , suppose I have two numbers: $2$ and $4$ I grab the number $2$ since it is the smallest $2$ is greater than $1$, for example $4$ should be greater than $1$ too ] Hence, $$\mathbb {P} (\min\ {X, Y\} > z) = \mathbb {P} (X > z \text { and } Y > z) = \mathbb {P} (X > z)\mathbb {P} (Y > z)$$ by independence
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