Holy fuck... And here I thought I was doing something fun with my life... I was looking on how to use the webull stock app. What do you use this stuff for anyways???
Can someone help me with this question. Dam capacity = 8,000,000 cubic meters Mean annual river runoff inflow = 14,300,000 cubic meters Coefficient off variation = 110% What is the probability that the reservoir will fill to full capacity from empty in one year assuming that the runoff data follows the Weibull distribution function?
Parameter - or in other words, just numbers to deciding the shape of the distribution Lambda represent the scale while Kapa represent the shape as in the video
If you look at the definition of a _density_ function, they only need to be non-negative an have integral of 1 over the real numbers. So it is indeed possible to have a probability density function with values greater than 1. Of course, this is not the case for probability _distribution_ functions, which are the capital F's.
I know it's a little bit late but probability density functions can indeed have values that exceed 1. But the outputs of that function don't represent the probability of the input since the probability of one single event happening is 0. Areas under the pdf curve is what represents the probability, and the total area is always 1.
your video explains better than my professor, who tried all semester lol thank you.
as is the case more and more these days
4:31 sir, since the probability of any event a
Hi, what reading material would you suggest for further study of weibull, Cauchy etc distributions? Also what is meant by a closed form cdf?
Can I ask some questions?
Thank you
Is scale parameter is always 1 ?
Holy fuck... And here I thought I was doing something fun with my life... I was looking on how to use the webull stock app. What do you use this stuff for anyways???
top explanation!
Sir pls give some information about inverse weibul distribution
Do anyone know will the sample space changed on this distribution?
Hai , may i know your sources of referrence for this weibull video?
Thank you .If possible sir just tell me about negative weibull distribution & about drawback & merits of that distribution.
Can someone help me with this question.
Dam capacity = 8,000,000 cubic meters
Mean annual river runoff inflow = 14,300,000 cubic meters
Coefficient off variation = 110%
What is the probability that the reservoir will fill to full capacity from empty in one year assuming that the runoff data follows the Weibull distribution function?
0.376
What is K and lamda??
parameters in this distribution
Parameters
Parameter - or in other words, just numbers to deciding the shape of the distribution
Lambda represent the scale while Kapa represent the shape as in the video
when K= 0,5 so for example f(0,1 )>1 !!!! a probability is always less than 1 ? how is that??
If you look at the definition of a _density_ function, they only need to be non-negative an have integral of 1 over the real numbers. So it is indeed possible to have a probability density function with values greater than 1. Of course, this is not the case for probability _distribution_ functions, which are the capital F's.
I know it's a little bit late but probability density functions can indeed have values that exceed 1. But the outputs of that function don't represent the probability of the input since the probability of one single event happening is 0. Areas under the pdf curve is what represents the probability, and the total area is always 1.
This is so good sir! Thank you so much for the explanation!
#befriendmaths
Nice
thank youi
Mmmmmm😊
isko padhana nhi aata