“For an object we’re gonna be using the state of North Carolina” is the most unusual sentence I’ve heard today and he says it like it’s something he does every Tuesday.
Actually no... equations are the ones who wont work if those are unknowns. This experimenthal method will always givve out the center of mass. However the difficulty lies in drawing those lines, however you can still measure the angle respect a fixed line in the object by which it rotates and trigonometry will solve the rest.
This is great. There is something coldly super-villain-ish about picking up a geographic region and calmly stabbing it with a pin in order to answer a question whose purpose is not revealed. My question is: how do you do this with something other than mass? Eg can you find the “centre of human population”?
Yes, but doing this with a physical demonstration wouldn’t make sense and isn’t very practical. But if you’re curious, there are resources showing such a point for the US and in every US state and county as of the 2020 census
hold the glass with your finger if you can and feel when the object has no tendency to rotate around your pin. You'll get approximately the same result. Or just simply guess the CoM and put it on top of a thin pillar and moves around to see at which point the glass stabilizes.
I don't have a passport sadly. So on the off-chance that someone lives in that place in NorthCarolina that the thing was pointing to...What happens when you go there with your centre of mass on this irregular object ? Thank you
Can you explain mathematically why we can always find a line through a lamina (eg a horizontal line y=a in some coordinate system on the lamina) such that the moments on either side of this line sum to zero. It's intuitively obvious physically (hanging plumb lines etc) as you describe here but I just can't prove this mathematically. The mathematics involves the integral of all the moments of every point mass of the lamina on either side of such a line, putting this integral equal to zero and solving for the coordinate of the centre of mass. But why can we always assume we can put such an integral equal to zero in the first place.
Finding the center of mass of such asymmetrical objects, is contingent upon it's described attraction to the center of an oblate spheroids mass, earth. Though how does one find the center of mass, of the asymmetrical oblate spheroid, itself?
Doesn't that just find the center of mass on a plane, i.e. on a single axis? Your map is basically flat. If I wanted to find the center of mass on an irregularly shaped three-dimensional object with irregular weight distribution, wouldn't I need a more complicated system of measurement to find the center of mass along two axes, i.e. two intersecting planes?
+Masked Marvyl indeed that is what came to my mind immediately I saw the map. I think this is the procedure of locating the center of gravity. I am trying to imagine something almost like a sphere but not and what the procedure would be.
in 3d objects you can find CG usig same procedure but by changing the plane of experiment. 1st you have to do it in suppose XY plaane you will get Xcg and Ycg then repeat it in YZ plane to get Ycg and Zcg.
Okay great. Now show the center of gravity on the same board so we can see clearly the difference between the two. Isn't that the right thing to do? This was an interesting video I must admit. You never once brought up the word gravity. Most folks start with mass and end up talking nothing but the center of gravity with the words mass mixed in. And if you pay any attention only then you get to enjoy being confused.
Tie a rope on your bike between the seat and handle bar. Lift it up from that rope and try to find the spot where it can lift both tires at the same time and same height. That is your center of gravity.
“For an object we’re gonna be using the state of North Carolina” is the most unusual sentence I’ve heard today and he says it like it’s something he does every Tuesday.
Must have studied in Theater
It's better to learn practical than imagining ...i like it .
same
exactly
Thank you! This helped me understand what my Conceptual Physics book was talking about.
thank you so much this is part of my sylabis for GCSE physics and i didnt understand the diagram on the book
Yash Nanda At least you had a diagram man, I’ve got notes that makes no sense
Yash Nanda yes that is very true. Even I am doing gcse and I didn’t understand
Hi present you
Sylabis?
I keep trying this on my balloon ..it doesnt hold the pin
Try it on ur balls
freakyflow 😂🤔
simply excellent! im using this method for quadcopter stuff and it truly helps. Thanks a bunch for the video, keep up the good work. :)
Thank you. This helped me with my t-shirt business and trying to center irregular images.
Wow, that's an interesting story! I think it's pretty cool that Physics helped you with your T-Shirt company.
needed this for physics
works only if the density, and thickness of the medium is a constant.
Actually no... equations are the ones who wont work if those are unknowns. This experimenthal method will always givve out the center of mass. However the difficulty lies in drawing those lines, however you can still measure the angle respect a fixed line in the object by which it rotates and trigonometry will solve the rest.
@@Michallote I think we actually agree
thank you! this helped my GCE physics revision.
This is great. There is something coldly super-villain-ish about picking up a geographic region and calmly stabbing it with a pin in order to answer a question whose purpose is not revealed. My question is: how do you do this with something other than mass? Eg can you find the “centre of human population”?
Yes, but doing this with a physical demonstration wouldn’t make sense and isn’t very practical. But if you’re curious, there are resources showing such a point for the US and in every US state and county as of the 2020 census
Brilliant! Thank you for the demonstration.
How can I find the center of mass if I can't put a pin in my object? (it's glass)
hold the glass with your finger if you can and feel when the object has no tendency to rotate around your pin. You'll get approximately the same result. Or just simply guess the CoM and put it on top of a thin pillar and moves around to see at which point the glass stabilizes.
suction cup
Thank you so Sir
You have resolved my big problem through this small and simple video
Thanks a lot for being on RUclips
I dont understand why you drew a third line.you can draw a third line through a cross even if it is not the centre of mass.understand what i mean?
very informative, thanks for sharing
I don't have a passport sadly. So on the off-chance that someone lives in that place in NorthCarolina that the thing was pointing to...What happens when you go there with your centre of mass on this irregular object ?
Thank you
I mean they point in NC isn’t anything special
Can you explain mathematically why we can always find a line through a lamina (eg a horizontal line y=a in some coordinate system on the lamina) such that the moments on either side of this line sum to zero. It's intuitively obvious physically (hanging plumb lines etc) as you describe here but I just can't prove this mathematically. The mathematics involves the integral of all the moments of every point mass of the lamina on either side of such a line, putting this integral equal to zero and solving for the coordinate of the centre of mass. But why can we always assume we can put such an integral equal to zero in the first place.
Good, Good... Now, as an european, i know that North Carolinas center of mass is the city of Sunford... this shall help me a bunch in life.
thank you for the demonstration ,it really helped a lot !!!
Very usefull for planes and stuff. Thanks for this nice demonstration, allthough i am not going to use a needle.
Finding the center of mass of such asymmetrical objects, is contingent upon it's described attraction to the center of an oblate spheroids mass, earth. Though how does one find the center of mass, of the asymmetrical oblate spheroid, itself?
Wonderful tutorial
ty, i have my physics exam tomorrow!
i dont get it, i have a "Γ" shaped plan and i need to find the center of mass, yet it doesnt seem to work for me
Anyone else find this kinda relaxing?
What if it's a hard and we can't pin?
What if your string was shorter?
I think now I get it
Needed this for my Kinesiology class (Biomechanics Unit) lol. Y'all saying it is for physics
Does anyone know who the professor is?
Doesn't that just find the center of mass on a plane, i.e. on a single axis? Your map is basically flat. If I wanted to find the center of mass on an irregularly shaped three-dimensional object with irregular weight distribution, wouldn't I need a more complicated system of measurement to find the center of mass along two axes, i.e. two intersecting planes?
+Masked Marvyl indeed that is what came to my mind immediately I saw the map. I think this is the procedure of locating the center of gravity. I am trying to imagine something almost like a sphere but not and what the procedure would be.
in 3d objects you can find CG usig same procedure but by changing the plane of experiment. 1st you have to do it in suppose XY plaane you will get Xcg and Ycg then repeat it in YZ plane to get Ycg and Zcg.
How would you find com in space?
2:53 the man is stabilizing the map with his finger
the man has no desires.
Quite incredible.
This helped a lot
Thanks for the video
Very nice. Thank You
How we do this with a heavy rock?
Thats great. I learnt a lot
This video is peak America.
Thanks king 👑
It's called a plumb bob.
Amazing
Brilliant, Thanks.
Tq
you seen to be a part of WW2 . (just a joke not to offend anyone)
btw nice video
Okay great.
Now show the center of gravity on the same board so we can see clearly the difference between the two. Isn't that the right thing to do?
This was an interesting video I must admit. You never once brought up the word gravity. Most folks start with mass and end up talking nothing but the center of gravity with the words mass mixed in. And if you pay any attention only then you get to enjoy being confused.
umm.. why must the intersection of the lines be the center of gravity?
because that is where the mass of the whole object appears to be aka center of mass (sry im writing after 7 years lol)
very cool
man said he pulled out a whole state
Thank You!
Thanks
thx for the information
Integrales Dobles
thankyou so muchh!
thank you sir! :)
who else is here from the centre of mass power point
can any one explain how to find center of mass of a bicycle.
Tie a rope on your bike between the seat and handle bar. Lift it up from that rope and try to find the spot where it can lift both tires at the same time and same height. That is your center of gravity.
HOW DO I CALCULATE IT WITHOUT A CAT'S TOY???
Any good 3D modeling software will have a tool for it. Without that, good luck for irregular objects if you're not gonna do an experiment.
0:57 that video bug?
Not a video bug. He's an alien and did something .
@@funkblack bruh😭
@@abdoulietaal985 i don't even know
asmr
inta 7mar
la jk you are smart
Eddieft9 😂😂😂
the first 19 seconds were the most awkward 19 seconds of my entire life.
I think you meant the last seconds? Because I don’t think he was able to balance the state?
I was disappointed it didnt balance
hi sir
instructions unclear, my dog ended up in the microwave
el dedito jajajaja
beacuase science.
Ay ay ay ay me pica el
North Carolina Elections 2020
😂😂
hahahaha!
hahaha
This gentleman looks very sad.
Thanks