Mooshu That’s because your professor doesn’t revolve around you. A professor or teacher only exposes us to the subject, we learn most of it through outside practice, eg: homework/tutoring/videos on YT.
Hi Audrey, that's not a stupid question at all!! I can definitely see why that is confusing. The mode is the most commonly occurring value so in a histogram if one tower is taller than the others then that is the mode. The median is the middle of all the values, so what tends to happen is that there will be a "peak" which involves several towers that are taller than the others all being bunched together. We're not looking for one tower that is the tallest, we're looking for a bunch of tall t
Thank you for your explanation. Can you explain what happen if, within the box the median lies closer to Q3 but the left whisker is short and the right whisker is long... is this still positively skewed? or negatively skewed Similarly, if the median lies closer to Q3, the whiskers on the right is slightly longer than the left, is this a negatiely skewed? very confused~~
bunch of tall towers. We're looking for where a large chunk of the data is all clustered together. So that might be at the tallest tower, but it might be on the second tallest tower which is nearby. It's not about the "peak" as in the highest point, is about looking for a shape that is like a mountain and realating it to that peak. Another way to think about is is where is the halfway point in the data. Split the data points down the middle, keeping in mind that taller towers have more
It may not be common, but I would like to know how to describe a boxplot where the box was skewed in one direction but the whisker was skewed in the other direction. I have seen some like that, especially with smaller sample sizes.
It's not really an exact thing, it's most just a case of "how does it look", there isn't a hard and fast rule to go by (that I know of) unfortunately. The main thing is to think about where most of the data is bunched up - is it all heaped on the left or all heaped on the right? Picture how the data would look as a histogram, and that can sometimes help. It's hard to answer specifically without seeing your data and the spread. My suggestion would be trying drawing it as a histogram might look
data points in them. When you split it roughly down the middle, you tend to find you've drawn a line roughly where the mountain of data is. That was a long-winded explanation... but I hope that helps a little bit! :) If not, let me know and I'll try and draw it for you :)
This was helpful, but it still didn't answer my question. Im looking at a box skewed left with the right tail being a lot longer. l--[ I ]-------------l
This helped a lot! Thank you so much! What if the reason for the long whisker is because of one number that is far from the other range of numbers but does not qualify as an outlier (the box is still perfectly symmetrical on either side but has a short whisker and then a long whisker)? Do we still say it is positively skewed? A histogram would show a space and then a little hill for that one number but it wouldn't look very skewed...
If the line is longer on the left but between the median more space is on the right , the distance between them is also equal then what is the skewness of data🤔??
Hi. Thank you for taking the time out with this explanation, it makes more sense now and your video helped me a lot! I'm very happy to have come across this clip.Thank you so much :)
Hi, this is really helpful. But I'm getting confused as to why we relate the peak of the histogram with the median on the box plot, because isn't the peak of the histogram the mode? Sorry if this is a stupid question. Thanks
Very Nice. Thank you so much. I finally got the positive and negative aspect when you said it is based upon simply going in a positive or negative direction. I was taught to look for the mean or median being less than or greater than each other and the mode always being at the top of the peak which is an overly complicated way of simply determining skew.
Why does the peak of a histogram correspond to the median (Q2) of a boxplot? The highest peak indicates the greatest frequency of a set of data, right? This would be the mode. It could be the mean, or it could not be. I'm confused why we have to assume that the peak of the histogram is the middle line (Q2) of a boxplot. Could someone explain what I'm not understanding? Thanks!
you have seen it right! The Median is by no mean a synomious for the modus. This will be the case if there are many observations between the first quartile and third quartile where the outcome values are close to each other with respect to the whiskers.That means that most data samples are concentrated around a specific value rather then spread out in a range. Therefore, Standard deviation and Variance are more better way in explaining if data are highly concentrated around a specific value or is it more uniform divided. Therefore A frequency table would be also a good help. A box plot is more applicable if you want to say something about what25% 50% or 75% is doing compared to another group.
I learn more from you than my professor.
Mooshu That’s because your professor doesn’t revolve around you. A professor or teacher only exposes us to the subject, we learn most of it through outside practice, eg: homework/tutoring/videos on YT.
Hi Audrey, that's not a stupid question at all!! I can definitely see why that is confusing. The mode is the most commonly occurring value so in a histogram if one tower is taller than the others then that is the mode. The median is the middle of all the values, so what tends to happen is that there will be a "peak" which involves several towers that are taller than the others all being bunched together. We're not looking for one tower that is the tallest, we're looking for a bunch of tall t
Thank you for your explanation. Can you explain what happen if, within the box the median lies closer to Q3 but the left whisker is short and the right whisker is long... is this still positively skewed? or negatively skewed
Similarly, if the median lies closer to Q3, the whiskers on the right is slightly longer than the left, is this a negatiely skewed?
very confused~~
I want to know this as well!
thank you so much! may God bless
bunch of tall towers. We're looking for where a large chunk of the data is all clustered together. So that might be at the tallest tower, but it might be on the second tallest tower which is nearby. It's not about the "peak" as in the highest point, is about looking for a shape that is like a mountain and realating it to that peak. Another way to think about is is where is the halfway point in the data. Split the data points down the middle, keeping in mind that taller towers have more
It may not be common, but I would like to know how to describe a boxplot where the box was skewed in one direction but the whisker was skewed in the other direction. I have seen some like that, especially with smaller sample sizes.
It's not really an exact thing, it's most just a case of "how does it look", there isn't a hard and fast rule to go by (that I know of) unfortunately. The main thing is to think about where most of the data is bunched up - is it all heaped on the left or all heaped on the right? Picture how the data would look as a histogram, and that can sometimes help. It's hard to answer specifically without seeing your data and the spread. My suggestion would be trying drawing it as a histogram might look
data points in them. When you split it roughly down the middle, you tend to find you've drawn a line roughly where the mountain of data is.
That was a long-winded explanation... but I hope that helps a little bit! :) If not, let me know and I'll try and draw it for you :)
Glad I could help! Hope it's all making more sense now
SO HELPFUL
if the left part of the of the box is skewed and the right part of the whiskers is skewed ... how would you explain this box plot pls... thnx
Very informative. Thanks
This was helpful, but it still didn't answer my question. Im looking at a box skewed left with the right tail being a lot longer.
l--[ I ]-------------l
what is ur question? u arent asking one
In this circumstance, it is skewed right.
Great video! I would remind people that box plots do not necessarily translate to unimodal data, but the principal of the skewness applies
This helped a lot! Thank you so much!
What if the reason for the long whisker is because of one number that is far from the other range of numbers but does not qualify as an outlier (the box is still perfectly symmetrical on either side but has a short whisker and then a long whisker)? Do we still say it is positively skewed? A histogram would show a space and then a little hill for that one number but it wouldn't look very skewed...
bruh why do I have to learn this in 4th grade
really helpful .. thanks alot for your explanation
Precisely what i needed! Thanks for the explanation.
That's really helpful. THX
If the line is longer on the left but between the median more space is on the right , the distance between them is also equal then what is the skewness of data🤔??
Thank you!
colleges looks at the worst possible ppl to hire as educators and hire 'em
full offense
Hi. Thank you for taking the time out with this explanation, it makes more sense now and your video helped me a lot! I'm very happy to have come across this clip.Thank you so much :)
Hello
thankyou so much . thanx for the question too
finally some useful video to clear the confusion
TY. Very helpful......
Really thank you, it is much appreciated,
Useful, thanks!
Thank you, you are amazing
Hi, this is really helpful. But I'm getting confused as to why we relate the peak of the histogram with the median on the box plot, because isn't the peak of the histogram the mode? Sorry if this is a stupid question. Thanks
Great ! Thanks from Belgium :)
You're welcome! :)
Thanks!
THANK YOU
Thanks for the simple clarification
how can you tell if its right or left skewed?
Very Nice. Thank you so much. I finally got the positive and negative aspect when you said it is based upon simply going in a positive or negative direction. I was taught to look for the mean or median being less than or greater than each other and the mode always being at the top of the peak which is an overly complicated way of simply determining skew.
Lifesaver 💝💖💘💞💗💖💕💓
Great!
Ty Liya for asking that question :D and ty vcefurthermaths for the tutorial. Was really helpful
Very helpful thank you :)
well I had the same question in my mind that the student had sent you before and I am really grateful !
Your videos are very helpful and very clearly explained. Thanks
thank you it help me a loot
Why does the peak of a histogram correspond to the median (Q2) of a boxplot? The highest peak indicates the greatest frequency of a set of data, right? This would be the mode. It could be the mean, or it could not be. I'm confused why we have to assume that the peak of the histogram is the middle line (Q2) of a boxplot. Could someone explain what I'm not understanding? Thanks!
you have seen it right! The Median is by no mean a synomious for the modus. This will be the case if there are many observations between the first quartile and third quartile where the outcome values are close to each other with respect to the whiskers.That means that most data samples are concentrated around a specific value rather then spread out in a range. Therefore, Standard deviation and Variance are more better way in explaining if data are highly concentrated around a specific value or is it more uniform divided. Therefore A frequency table would be also a good help. A box plot is more applicable if you want to say something about what25% 50% or 75% is doing compared to another group.
Tysm 💗
thank you this was very helpful.
This was so helpful! You are amazing!!! ❤❤❤
+1 for clarity
This is really useful! Thanks!
Very helpful.
Thanks! Helped a lot :D
Very informative
this is so helpful
What an angel.
so useful! thank you.
Thanks soooo much :))
Well done. Bravo!
thanks :)
thankyou! :)
THANKK YOU I UNDERSTAND NOQ
You just saved my life, thank you! This stuff was going to make me cry
4 years i wonder what ur doing in life rn
@@bobsmith9422 2 years, I wonder what you're doing in life right now lol
@@riyaagnihotri26 2 months, i wonder what you're doing in life right now lol
@@bruhmomentum1387 1 year I wonder what you're doing in your life right now
Wtf