Extra footage at: kzbin.info/www/bejne/l4iag2SLa6uAgtU
@utsavthakur68792 жыл бұрын
I'm from India. We get these question in our coordinate geometry part and IIT-JEE Entrance exam. I knew it!!!!! We learn this in application of reflection of point in 2D plane.
@СвятославГлуздов-ч5ч2 жыл бұрын
Area and length have 1st order continuity. Therefore, it is possible to make a parallel transfer of the gradient of the hypotenuse line. This action is equivalent to flipping triangle AFX about the vertical axis. Therefore, we get the similarity of triangles. This result follows from the double ratio of four points. Therefore angle FXA is equal to angle CXB.
@utsavthakur68792 жыл бұрын
Hey I have a question in which I find difficult to believe the answer 1. Suppose that circle of equal diameter are packed tightly in "n" rows inside equilateral triangle then Lim (Area of n circles/Area of equilateral triangle) n-> ♾️ Is pi/2(root3)
@TheSucread2 жыл бұрын
What Professor Zvezda is explaining fantastically in this video is the standard exercise in undergraduate physics courses when Fermat's principle is introduced in optics. To be completely true, the path taken by light (weighted by an index of reflection, so called optical path) needs to be stationary (which typically is minimal). There are so cool physical examples when light takes a non-minimal path, e.g. max path in optical fiber with gradient of index of refraction, saddle points for light reflective from a concave mirror.
@jagatiello69002 жыл бұрын
This problem turned out to be somewhat similar to that of calculating the length of a 1-turn helix over a cylinder. The reflection trick also reminded me of the method of images (in electrostatics).
@trucid22 жыл бұрын
Another way to think about the weighted problem is if the farmer was on the other side of the river and needed to swim across. Assuming no current, and given farner's speeds over land and water, where should he get out of the river on the other side?
@olivialuv12 жыл бұрын
Non-minimal paths gets me thinking about geodesic differentiations & geodesic spaces
@Triantalex10 ай бұрын
??.
@animeshbaranawal27812 жыл бұрын
I need to give credit to Brady. What makes these videos even more enjoyable are the excellent and more so human questions posed by Brady to the professors. Big fan of all his channels!
@patrickthegoat2 жыл бұрын
As someone who struggled with finding math interesting at school, I can only say it’s videos like this one that have made me fall in love with the beauty of mathematics as an adult. Thank you!
@mina862 жыл бұрын
FYI, what Dr. Stankova hinted towards the end was Principle of least action which is a way to think about problems in physics.
@methatis30132 жыл бұрын
Its actually Fermat's principle when it comes to light. Light takes the path of least time, not least distance
@firstnamelastname3072 жыл бұрын
I think it is a geodesic in an extremely curved space : a folded piece of paper along the river
@ar_xiv2 жыл бұрын
And the dog water frisbee problem is equivalent to light changing medium like from air to glass (or water)
@alexwang9822 жыл бұрын
@@firstnamelastname307 it is
@TAP7a2 жыл бұрын
@@methatis3013 that is an application of the principle of least action, yes
@ke9tv2 жыл бұрын
The familiar calculus problem with the dog and the Frisbee in the water gives the same answer as Snell's law of refraction. All of these things turn into Lagrangians and the principle of least action - which feels more fundamental than most of the laws we learn in high-school physics.
@davidbarnett86172 жыл бұрын
Feynman described action beautifully in his Messenger Lectures.
@caleblatreille82242 жыл бұрын
this is my favourite "gotcha" moment in any Numberphile so far. Well done, Prof. Stankova!
@Narokkurai2 жыл бұрын
I remember actually solving this one geometrically in middle school. I figured that there were two "sub-optimal optimizations": one where the farmer minimized his walk to the water and then went directly to the cow, and another where he minimized his walk to the cow and took a long route to the water. I drew the intersection of these paths and then supposed that dropping the perpendicular from that point would give me the point on the river with the shortest path possible, without ever needing to actually solve for X. I didn't know how to prove my strategy, however it was correct.
@hps3622 жыл бұрын
That is a fascinating observation. Some maths voodoo right there.
@marpaub2 жыл бұрын
What you describe is looking for the intersection of the lines FB and AC. The points (0|2) and (4|0) lie on FB and the points (0|0) and (4|6) on AC. Therefore, FB is equivalent to Y = -1/2 * X + 2 and AC is Y = 3/2 * X. Set -1/2 * X + 2 = 3/2 * X to find the intersection. It follows that X = 1.
@fahrenheit21012 жыл бұрын
The fact that it worked is astonishing.
@glowingfatedie2 жыл бұрын
"without ever needing to solve for X" uhh... but solving for X is the problem as given. At any rate, your insight about the perpendicular from X was spot-on, and solving the similar triangles, you do get AX=1 and XB=3.
@wtspman2 жыл бұрын
Brilliant insight. What you describe is the same as a crossed ladders problem.
@marklonergan38982 жыл бұрын
"skip to 9:30". Me: (wondering who comes to numberphile to skip the hard maths)
@pcfilho4252 жыл бұрын
This is brilliant. Thank you, professor Zvezda! 😊
@timseguine22 жыл бұрын
The thanks so nice, you gave it twice.
@bengt-goranpersson51252 жыл бұрын
I really like Zvedelina. 11:37 "We are the bosses." Unironically one of the best math advice I've ever heard to be honest.
@NoActuallyGo-KCUF-Yourself2 жыл бұрын
It's what I tell my students all the time, "because I said so" - it's a postulate, I can do whatever I want.
@MaddHatter2 жыл бұрын
For the 0 width assumption, I think it makes more sense to say "we don't care about the middle of the river because you don't go to the middle, you go to the shore line, the shoreline is 0 width" I know it is trivial, but makes more sense to me.
@ArawnOfAnnwn2 жыл бұрын
That makes sense for the farmer on the same side, but not for the hypothetical one on the other side. Cos if the river had a width, then sure he could fill his bucket at the shoreline too, but he'd still have to swim across the river to get where the first farmer would start his walk back from. It makes the two farmers non-identical if the river has a width.
@PowerChannel882 жыл бұрын
The zero width assumption was made for the phantom farmer analogy. The width of the river doesnt matter any way to the problem, but if someone visualizes it with the phantom farmer they might be thinking they need to be at the other shore. And when the width is zero both shores are the same.
@MaddHatter2 жыл бұрын
For both comments, I agree I guess I was poorly communicating that we can assume 0 width as an analog for the mirror person. Not that the river is 0 width...
@PendragonDaGreat2 жыл бұрын
I think the fact that we're also dealing with distances measured in kilometers and most river widths are measured in the tens to maybe hundreds of meters (I mean obviously not all, portions of the Amazon are over 10km wide) allows us to ignore it. Also obviously the reflection occurs on the near shoreline, and not the river centerline.
@gustafcarstam55782 жыл бұрын
@@ArawnOfAnnwn its a phantom farmer. he floats above the water like any phantom would. He only needs to reach the shoreline on the other side of the river at the same spot as the real farmer reaches the shoreline. There is no point in them meeting up somewhere in the river.
@icouldnotplanthis21522 жыл бұрын
Fun little exercise: After the Farmer has filled the bucket of water it obviously is more heavy so it gets more exhausting the earlier he fills it up. So actually we should account for that increase of energy he needs. So how does X change if you assign different weights to the the two paths? Say walking with the empty bucket costs 1 energy per unit length. Walking with the full bucket costs 2 energy per unit length (it's a big bucket lol). Try to minimize the total energy as a function of X. Edit: 21:10 same thought haha
@tararat2 жыл бұрын
Another way to modify the problem is set conditions that the farmer can run (say) 3 times faster with an empty bucket than walk with a full bucket and the solution criterion is minimize the time to get water to the cow.
@chuckgaydos53872 жыл бұрын
Don't forget to account for water evaporating from the bucket which varies due to the temperature differnces at different parts of the day.
@DAlchymist2 жыл бұрын
Just double the 6 km to 12 km and you get the solution. (I guess)
@bivshiyministerr94242 жыл бұрын
Just take a physical environment, where light take speed 1 before entering the water and has speed 0.5 in a water. Then use laser to figure out where you direct it to hit the cow. In this test the cow should be in a river.
@DS-xh9fd2 жыл бұрын
Once on a physics midterm, we were asked to use Fermat's principle to prove that the angle of reflection equals the angle of incidence for mirrors. We were expected to use calculus, but I wrote the geometric proof. The grader gave me almost no points for my solution, but I took the test to the teacher later and managed to get my score adjusted.
@carultch2 жыл бұрын
One possibility is that the author of the exam, was trying to see if you understood the methods taught in the class. So I can understand why you wouldn't get credit for a geometric proof like this. I could understand this being the case for this problem appearing on a Calculus exam, but not on a Physics exam.
@poulanthrope2 жыл бұрын
I didn't think about it in terms of either method, I kind of split the difference. I thought about turning them into similar triangles, and since they were 2 and 6 on one side, that reduces to 1 and 3, which add to 4, so the farmer should go to 1 since A and B are 4 apart. It was intuitive, quick, and correct. My thoughts on 'proof' would be to take it to extremes. If you're shifting the point the farmer reaches left or right, it's shortening one hypotenuse but lengthening another. It's intuitive for the transition point between lengthening and shortening the path to happen when both triangles are the same scaled shape (scaled step increases on either side would have the same effect on both hypotenuses, so the path wouldn't be shortening on one side and lengthening on the other), and since it's longest at A and B, that makes the path shortest when the triangles are similar. I guess my justification takes longer, but the solving took almost no time at all.
@Synergyseek2 жыл бұрын
My first thought was similar triangles as well. I felt the need to justify why they are the shortest, so I imagined the farmer on the opposite side of the river, which makes identical triangles to the given problem and turn his path into a straight line. From a physics perspective, light takes the minimal path so our path should reflect at the river, giving similar triangles.
@Son_Of_Atreides2 жыл бұрын
I was also thinking about similar triangles, but subconsciously. I was actually thinking about a light ray reflecting on a mirror and the equal angles of the reflection.
@skilletpan56742 жыл бұрын
I was thinking about ratios. 2+6 is 8 and 2 is 1/4 of 8. 1/4 of 4 is 1 so I assumed that was the anwser.
@wingracer16142 жыл бұрын
I had three ideas and that was one of them. My two other ideas were very wrong.
@huntermclaren3222 жыл бұрын
Professor Zvezda is a FABULOUS educator!
@mokopa2 жыл бұрын
It's really worth watching all the way through to the end where it gets quite more thought-provoking, philosophical even, than just an interesting mathematical problem.
@firstnamelastname3072 жыл бұрын
agreed ... two assumptions ... axiom or law ... that not seem to matter because same ... is mind blowing
@TyTheRegularMan2 жыл бұрын
Always ecstatic to see a new Zvezda video!
@frankjohnson1232 жыл бұрын
When I knew there was an elegant solution I immediately thought that triangle FAX should be similar to triangle CBX but didn't realize why until the explanation. Nice problem!
@johnchessant30122 жыл бұрын
I've seen this problem before in "The Art and Craft of Problem Solving" by Paul Zeitz (an absolute must-read for anyone interested in contest math problems). So to me, the shortcuts used in the algebraic solution are really elegant too; it's easy to just multiply everything out and plug-and-chug, but knowing what can save some effort there is an art in and of itself.
@SuperDreamliner7872 жыл бұрын
As a math teacher I will definitely show this problem and the solutions to my pupils when I get to teach calculus-type stuff. Absolutely fascinating! Greetings from Germany!
@krishna89762 жыл бұрын
I'm glad you kept the whole video. It's why your videos are amazing!
@SmileyMPV2 жыл бұрын
I watch numberphile to hear mathematicians answer questions like "what happened to the width of the river" with "who cares"
@vanhavirta Жыл бұрын
Makes sense, since the farmer gets the water from the shore (the edge of the river). That has no effect on the reflection aspect 😊
@ganymedemlem61192 жыл бұрын
I'm very happy that I thought up aa different way to do it. My initial thought was that the minimum distance would have both triangles have the same angles at each point so I thought I would try to solve for the angle to get the length of the hypotenuse. Glad to know I was on the right track!
@straylightc4b2 жыл бұрын
I met these concepts studying Fermat's principle in physical optics at Uni, it was also introduced with a farmer but with a meadow and a ploughed field. Thanks
@firstnamelastname3072 жыл бұрын
Also: The ellipse with focal points F and C tangent to the river determines X. And we then also see that for any ellipse, the angles made by any tangent line and lines from focal points to point of contact are equal. And: To estimate X having river and cow in sight, farmer might want to seek advice from a billiard player if one happens to be available. Note: The problem at hand is old and attributed to Heron. And: The path can be seen as geodesic in an extremely curved space, in this case : the paper folded along the river.
@znxster2 жыл бұрын
This is really interesting, showing that rethinking the problem can reduce the complexity of solving.
@zergbergerdelemon96342 жыл бұрын
Zvezda's videos are always insanely inciteful
@mathematicacivilis2 жыл бұрын
Great example of how a change in perspective, by deforming the problem in this case, is many times key to gain new insights. As always, Professor Stankova does a marvelous job guiding us through all the intricacies of both solutions. One reflection over the geometric solution (pun intended): This is a small variation of the solution presented in the video. Extend segment BC to the other side of the river to point P, such that, F'P is parallel to AB. We'll have F'P = AB = 4 AF' = BP = 2 and CP = BC + BP = 6 + 2 = 8 Now, consider the two triangles XBC and F'PC. They are obviously similar (2 equal internal angles). Therefore: (4-x)/6 = 4/(6+2) => 4-x = 3 => x = 1 We can generalize this approach to obtain: x = AB/(BC + AF) * AF and AB-x = y = AB/(BC + AF) * BC or x = cotan(α) * AF and AB-x = y = cotan(α) * BC , where α = angle(CF'P)
@pcfilho4252 жыл бұрын
This is brilliant. Thank you, professor! 😊
@StaticMotions2 жыл бұрын
Clear, concise, and brilliant explanation
@sandipbharati88932 жыл бұрын
Great way of explaining the solution! Thank you. If I may, the shortest path between 2 points is always a straight line.
@raychi8712 жыл бұрын
No words can describe how amazing this video is. THANK YOU
@advpmishra2 жыл бұрын
Now I realise that COW-CULUS was a pun ...
@xyz.ijk.2 жыл бұрын
I love the Professor's work and lament that I didn't have such an extraordinary teacher growing up. (Notwithstanding that an extraordinary 5th grader in Bulgaria is not the same here in the U S. because Europe is about four or five years ahead of us in almost every subject. It's painful how far behind we here are here in the U.S.)
@Rotom23042 жыл бұрын
Paused at 3:49. Ok, when I heard there was a trick I checked to see if just going in a straight line one of the two trips would work. It gives 2+ sqrt(52) about 9.2111, and sqrt(20)+6 about 10.4721. Then I checked the midpoint, sqrt(8)+sqrt(40) about 6.3246. Ok, niether straight path gives better than just the midpoint, so maybe it's the midpoint? Straight. Straight. The shortest distance between two points is a straight line, right? Oh! What if the cow was on the other side of the river! Then we could make a straight line! And the farmer's path doesn't change lengths if you just flip directions, so it works. Now just find the slope. He goes down 2 and then "down" 6 more for -8 rise, and runs by 4, so the slope is -2. Where is he on the river after going down 2? 1 away from his starting point. x=1 QED Booyah.
@MrPeloseco2 жыл бұрын
Big fan of Numberphile, but bigger fan of Zvedelina! ❤️
@vsalt692 жыл бұрын
A physical way to implement this: The farmer has a helper walk along the riverbank holding a mirror parallel to the riverbank. The moment the farmer can see the cow in the mirror, their helper is at the point on the riverbank the farmer should walk to. Although in the physical world, the farmer would probably want to minimize the length of their walk while carrying water...
@carultch2 жыл бұрын
Right, you might introduce two different speeds for the farmer to walk. One when carrying the bucket, and one when walking unladen. I came up with an example, where the farmer can run 10 km/hr with an empty bucket, but can only travel at 5 km/hr with a full bucket, using the numbers given in this problem. Empty bucket distance to run: d1 = sqrt(2^2 + x^2) Empty bucket time to run: t1 = d1/v1 Full bucket distance: d2 = sqrt(6^2 + (4-x)^2) t2 = d2/v2 Objective equation: T = t1 + t2 T = sqrt(4 + x^2)/v1 + sqrt(x^2 - 8*x + 52)/v2 T = sqrt(4 + x^2)/10 + sqrt(x^2 - 8*x + 52)/5 The solution occurs at x=1.84 km. There is an exact expression for it, but it is complicated. Perhaps there is a special case of given speeds, that make it easy to solve, but I haven't explored them. You probably could solve it with Snell's law and refraction theory, as a shortcut to solving it with Calculus.
@advaykumar97262 жыл бұрын
Take the position of the farmer (0,2) and takes its image and join the image and the coordinate of the cow which is (4,6) The point where the line intersects the x axis is the required point The equation of the line will be y=2x-2 putting y=0, we get x=1 Hence the point is (1,0)
@joajoajpedroj92532 жыл бұрын
I had a professor give very similar examples last semester and between classes talked to him about alternative solutions. His response was that he was giving that simple example and wanted us to use the calculus solution because anything more would be horrible for someone learning basic calculus but sometimes impossible with "5th grade" solutions.
@samcalder69462 жыл бұрын
Immediate thought at 1:52 ... reflect the smaller triangle around the X axis, form an effective 8 by 4 triangle, IE. a 2:1 gradient, so go up by 2 to reach X=1 Reassuring the instincts are still dialled in after all these years.
@TitusRex2 жыл бұрын
Use the reflection of one of the points across the river and draw a straight line.
@stevenmathews76212 жыл бұрын
the experiment with the dog obviously absolutely has to be run
@sgtreckless51832 жыл бұрын
Zvedelina is honestly one of the S tier Numberphile presenters.
@sgtreckless5183 Жыл бұрын
@@JohnPretty1 Like top tier, one of the bests!
@phizc2 жыл бұрын
The "Dog on beach fetching frisbee in sea" problem is an analog for refraction. The index of refraction is how much slower the dog swims than runs. I watched one of the Richard Feynman lectures on YT where he showed the same thing, but in his example it was a lifeguard and a drowning person. Cool stuff. The light follows the path that minimizes time.. Well, probabilistically.. It was about quantum mechanics after all..
@HAL-oj4jb2 жыл бұрын
For anyone who wants to know about the problem with the dog and the frisbee: it is a similar problem but instead of reducing the distance, you have to reduce the time of the path (which is the same for the farmer because his speed is constant), which leads to the the laws of Snellius, which also descripe how light bends when it passes through glass or water. Allegedly, dogs know this intuitively and actually take the fastest paths in these kinds of situations, but I'm not sure how legible this is.
@belagoblyos78222 жыл бұрын
In this case: how the light reflects (and not bends).
@derekmcgoldrick2373 Жыл бұрын
The farmer might consider the weight and collect the water from the shortest distance between the cow and the river :)
@TheNJdK2 жыл бұрын
"we can try that with a real dog and see what happens" - was REALLY hoping this was going to be in the Extra Footage
@janezjaneznovaknovak15412 жыл бұрын
Rather than "just ignoring" the width of the river, it would be better to say that we mirror the farmer over the point of the river that is closest to the farmer.
@keyboard_toucher2 жыл бұрын
From calculus, I found that if 'a' and 'b' are the two distances to the river and the distance to be traveled along the river is 'c', then x = a * c / (a ± b), (the sign of b is whatever satisfies 0 < x < c), which works out in this example as x = 2 * 4 / (2 + 6) = 8 / 8 = 1. I tried to find a useful geometric interpretation for that equation, without much success. What I did was begin with the drawing as in 2:36 and extend AF upward to a point P, and extend BC upward to a point Q such that PQ is parallel to AB and AP = BQ = AF + BC. Now draw the rectangle APQB. Draw a line through X parallel to AF. Draw a line through F parallel to AB. These two lines divide rectangle APQB into into four non-congruent rectangles. The equation implies that the length "x" is the solution when the upper left subrectangle and the lower right subrectangle are equal in area! What's the geometric justification for this?
@Retroist20242 жыл бұрын
The mirroring method is also used in physics such as static electricity, a grounded plane acts as a mirror that reflects charges above
@lifeisawesome1391 Жыл бұрын
Pool players are often school dropouts but they play pool as if they knew carculus, geometry, and physics
@bandana_girl6507 Жыл бұрын
The connection to light can actually solve a lot of the other issues that come up, potentially even turning them back in to geometry problems
@kayleighlehrman95662 жыл бұрын
I wonder how much more devious the question becomes if the farmer walks slower with a full bucket than with an empty bucket?
@deltalima67032 жыл бұрын
The cow is a sphere, why doesnt the farmer just roll it over to the water?
@deltalima67032 жыл бұрын
The stream is downhill from the cow (or it would be a lake), so all the cow needs is a little nudge in the appropriate direction to get there.
@carultch Жыл бұрын
It would turn from a reflection problem, into a refraction problem. Instead of aiming for the point where his angle of approach equals his angle of reflection, like we do when he walks the same speed, we'd solve it as follows. Consider the phantom farmer on the opposite side of the river, who walks to point x, at speed v1. The phantom farmer then meets the real farmer, and the real farmer walks at speed v2 to the cow. We'll call the angle of approach for the phantom farmer, phi1. and we'll call the angle the real farmer continues, phi2. Both angles measured perpendicular to the river. Recall Snell's law: n1*sin(phi1) = n2*sin(phi2) Since n's are inversely proportional to speed, this means: sin(phi1)/v1 = sin(phi2)/v2 Now we would construct the triangle where phi1 and phi2 come in this proportion.
@carultch Жыл бұрын
For an example that simplifies nicely, consider the same setup as we had with the original problem, except the cow is 2*sqrt(3) kilometers (approx 3.46 km) from the river, and the farmer's speed when carrying the full bucket is 1/sqrt(2) of his speed (approx 70.7%) when carrying the empty bucket. To recap the other data, the farmer starts 2 km away from the river, and the x-position of the cow is 4 km. The farmer approaches the river on a 45 degree angle of approach to the x-position of 2 km. Using Snell's law: sin(45 deg) = sin(phi2)*sqrt(2) Solving for phi2, we get phi2 = 30 degrees. This is consistent with a triangle that is 2 km on its base, and 2*sqrt(3) km on its height. Total distance travelled = 2*sqrt(2) km + 4 km = 6.83 km
@marceleza792 ай бұрын
Just apply Snell's law
@Deejaynerate2 жыл бұрын
This one was really fun. I figured out the geometric solution very quickly when I realized that the shortest path would be the one where both triangles had congruent angles, then used trig identities (tan theta = opposite over adjacent) to calculate the rest. However, seeing the calculus solution in action has also reminded me of how effective and precise it can be. Overall, this was a great video, reminds me of a problem I took from calculus one involving a cow looking at a sign.
@Neil-ii3dp2 жыл бұрын
Sorry y'all. If I'm the farmer I would minimize the distance I have to walk with the full bucket, even if it meant walking farther overall. Even 6 km is a long way to walk carrying a full bucket!
@paulf53512 жыл бұрын
It's simpler for me if the river is a mirror. You can aim for the reflected image in in the mirror. Just like bank shots in pool and off the backboard in basketball.
@Clyntax2 жыл бұрын
I solved it easily in a different way: Imagine the two parts of the way being a rope that is wrapped around a boat on the river. Now you pull both ends to shorten the string. Of course the boat stops moving if the angle between river and the two string parts is the same. So you have 2 congruent triangles that are also found in the video.
@StuMas Жыл бұрын
It felt like any point between A and B might be the same but, the phantom farmer was simply genius.
@quill4442 жыл бұрын
My initial thoughts after three minutes into the puzzle: Since walking "up river" is uphill, and since carrying a bucket full of water is much more difficult than walking with an empty bucket, it seems possible that it might be energy efficient for the farmer to walk straight upstream, not just near to Point B, but perhaps even a bit farther! Then, once the bucket is filled, his walk to the cow (under more duress from the full bucket) is all downhill. You must account for the fact that walking with a full bucket is inordinately more difficult than walking with an empty bucket! - j q t -
@samcalder69462 жыл бұрын
Real farmer would probably drive his 4x4 directly from F to C, then shoot the cow to put it out of it's misery.
@TitusRex2 жыл бұрын
BTW, this is called Heron's problem.
@Michael9W2 жыл бұрын
There is also a mechanics solution. It leads to equal angles as well. Imagine a rope sheave which can move along the river freely and rubber that goes from the farmer to the cow through the sheave. The sheave will stop where the total length of the ruber is minimal and it will be where ruber goes to farmer and ruber goes to cow on the same angle to the river. (and it will work for curved river as well)
@firstnamelastname3072 жыл бұрын
exactly! an ellipse tangent to the river
@stulora31722 жыл бұрын
Concerning the dog-frisbee problem: I remember reading that some mathematicians actually tested this with dogs and it turns out, they instinctively run and swim in along the optimal path!
@m.h.64702 жыл бұрын
My absolute first thought was: The river is a mirror and the path to take is a light. Which means, either the path from the origin to the river or the path from the river to the cow can be mirrored on the river to give a straight line. This gives a big rectangular triangle with 8 and 4 as the legs. Or, if you put it in a coordinate system, the hypotenuse becomes a line with the gradient of 8/4 = 2 (or -2, if the cow path is mirrored). Now you only need to calculate the intersection with the x axis. Given that the origin is 2 away from the x axis and the gradient is also 2, the line will intersect after 1 unit. As such, x = 1
@bscutajar2 жыл бұрын
Same exact thing happens with refraction. The path when crossing two media at an angle is also the shortest one. Edit: the dog and frisbee problem is exactly what I am talking about
@jeremydavis36312 жыл бұрын
I helped a 10th-grade geometry student with this problem. Of course my first thought was to use calculus, but this student didn't know any calculus, so that wouldn't have helped at all. We actually solved it using the way light reflects off a surface and my knowledge that light always takes the fastest path. The student didn't already know that, so it was a bit of a leap, but doable. A few hours later, the reflection popped into my head, and I couldn't believe how obvious the solution had suddenly become.
@AlannaStarcrossed2 жыл бұрын
Zvezda is always a treat to watch
@dave1907852 жыл бұрын
I swear I got this straight away using a vertical line of symmetry and similar triangles. Never got anywhere close a numberphile question that quickly.
@ominollo2 жыл бұрын
Zvedza is great!
@Rick.Fleischer2 жыл бұрын
Such a beautiful simplification.
@trizgo_2 жыл бұрын
4:04 me: *sips coffee and listens intently*
@Nikolas_Davis2 жыл бұрын
I have a simpler calculation for finding X. To get to the cow, the phantom farmer walks 4km "horizontally" and 6+2=8km "vertically" (perpendicular to the river). So, he covers half the distance horizontally that he covers vertically, and that holds for any part of the distance, since he walks on a straight line. To get to the river, he has to walk 2km vertically, so when he gets there he will have walked 1km horizontally. Therefore, X = 1km.
@lucasmoulin18862 жыл бұрын
Great video ! The geometric approach can also be done using Thales's theorem to find the value of x, instead of similar triangles.
@cas71522 жыл бұрын
Cowculus and elegant geomootry
@oldcowbb2 жыл бұрын
i'm glad calculus is finally getting some love from this channel lately
@arneperschel2 жыл бұрын
I'm a beginning farmer and I was able to solve this problem on my own. Surely I'm in for a successful career!
@NAT0P0TAT02 жыл бұрын
its crazy how so many people in the comments (myself included) just intuitively knew that the shortest path would have both triangles being the same angle seeing the example with one triangle flipped upside down makes it super obvious but before that 'proof' we just somehow knew
@Lolwutdesu90002 жыл бұрын
You can also solve for matching the gradients of F'X and XC. You're essentially working out the 'coordinates' of point X. You get the same result. Simpler IMO than creating triangles.
@Pedritox09532 жыл бұрын
Love the videos with Zvedelina!
@stevewolfe60962 жыл бұрын
A physical solution. Consider the river as a rod with a frictionless ring Run a (frictionless) string from the farmer through the ring to the cow and pull tight. The ring will slide to the point where the force from each segment is equal i.e. the angles are equal >> the two right triangles are similar.
@WAMTAT2 жыл бұрын
Next video needs to be with a dog and a Frisbee.
@TheVoidSinger2 жыл бұрын
Two intermediate solutions (also abusing geometry): 1) Line parallel to the river from the farmer, line from the cow to the river, that touches the river at half the distance it crosses the parallel (~aiming a reflection) 2) Farmer and cow on a circle's edge, change the size of the circle until the diameter touches the river (very similar to the square root construction)
@philotomybaar Жыл бұрын
I think it’s even simpler to extend the large triangle down to F’. You end up with a base of 4, height of 8. Then the small triangle’s ratio is proportional: 4:8 = (4-x):6. x must equal 1. Apologies if someone else in comments pointed this out.
@mrsnidesmin2 жыл бұрын
Re Brady’s question on instinctually finding X. I’m imagining a scenario where the farmer can see the cow and river, but have no measurements. I think it’s solvable via bearings and perspective (as the farmer’s vision is vertically above the plane) The direction to point A is determinable (the river should have left-right symmetry when looking at it). The bearings FA and FC can then be drawn from a point on the ground. The location and bearing of point B can be determined by imagining a line from C to the river, and using the same perspective technique to determine the perpendicular from F to that BC line. That line can be extended to point C’ which is determinable also using perspective. Then the farmer just heads towards C’.
@RoadsideCookie2 жыл бұрын
I think the question is more human than this. As in, the farmer could instinctually A: want to get to the water as fast as possible, B: minimize total distance, C: minimize distance walking with a full bucket, D: not care at all and just wing it. So technically, this problem becomes a social experiment when you ask that question lol.
@mrsnidesmin2 жыл бұрын
I guess I'm describing how I'd go about it, though yes... I would sort of wing it and not do the exact measuring. Exact methods wouldn't be realistic in practice as the plane would likely not be perfectly flat, and the river not perfectly straight. However, when looking around, I would make a crude mental effort to estimate where the point C' would be and head for it.
@mrsnidesmin2 жыл бұрын
You're option C though is probably smarter than option B. That didn't occur to me.
@Richardincancale2 жыл бұрын
So the cow / bucket story = reflection and the dog / frisbee story = refraction. Are there animal analogues for all physics problems?
@ribal32692 жыл бұрын
I never click as fast as when I see a Numberphile video with professor Zvezda in the thumbnail!!
@ALIPIANIST2 жыл бұрын
I've got x = 1 and x = -2 , the second solution is where the short hypotenuse overlaps with the long one.
@kruksog2 жыл бұрын
17:32 I believe this is a specific case covered by Snell's theorem/ law.
@postmodernist18482 жыл бұрын
What we generally do at school with these minimising/maximising tasks is solve f'(x) = 0 and find when it's positive or negative. This way you can find the points of maximum and minimum when the sign changes from negative to positive (which is a minimum point) and vice versa (which is a maximum point)
@FreudeAnEtwasFinden2 жыл бұрын
Great Video! Thank you Zvedelina! 🙂❤ Could you please comment again on the axioms of nature and equivalent mathematical concepts or structures? ( 18:20 - 18:55 ) It would be very interesting to know what else you think about it. ...maybe with another example?
@KipIngram6 ай бұрын
Yes, the calculus way works when it's not all consistent throughout the problem. Like when different materials are involved that light moves through, etc. The calculus way does what calculus always does - it lets you solve a problem where conditions along the solution trajectory are changing.
@_learn_for_life_2 жыл бұрын
Fermat's Principle: But still why light takes the shortest path?
@doubledarefan2 жыл бұрын
What do you use to count cows? A Cowculator.
@AndyHolt22 жыл бұрын
Another potential solution is taking that reflection idea for the straight line and then y=mx+c The line goes through (0,-2) and (4,6) You can derive the gradient from that and then the crossing is x where y=0
@Your2ndPlanB2 жыл бұрын
I think there's a similar 'geometric' solution to the dog-frisbee problem: if we draw the beach/water boundary as the x-axis, we simply scale all y-distances on the "water" side by _c_ , where _c_ is the speed on the sand divided by the speed in the water. Then for similar reasons, the optimal path will be given by the straight line drawn to the "phantom" scaled frisbee. And again, this corresponds to a light beam going from one medium to another, and having some angle of refraction :)
@DerNesor2 жыл бұрын
At first I thought: Well light takes the quickest path and it also reflects on a surface. So it must be the same angle in and out. -> 9:30
@markring402 жыл бұрын
Professor Stankova is awesome!
@Shildifreak2 жыл бұрын
But wouldn't be carrying a full bucket be more exhausting than carrying an empty bucket? :D (Nevermind it was mentioned at the end.)
@numberphile2 жыл бұрын
I did discuss this with Zvezda - can’t recall if it was in camera. You can easily start inserting extra variables such as this. Escalates quickly I’m sure.
@LA-MJ2 жыл бұрын
It's refraction instead of reflection
@kappasphere2 жыл бұрын
@@LA-MJ Even the original method was to imagine a case of refraction instead of reflection - but with a refractive index of 1. What changes in the case of being slower after passing "through" the river is that the refractive index is exactly the ratio between the farmer's original walking speed and the speed that he has when carrying a bucket. So you don't even need a new analogy of light, it's still the exact same analogy but with different numbers.
@carultch Жыл бұрын
For an example that works out nicely, consider the same numbers, but place the cow at 3.46 km from the river. Suppose the farmer with a full bucket can walk at 1/sqrt(2) of his speed with the empty bucket. The optimum point turns out to be x=2 km. The farmer approaches the optimum point at a 45 degree angle of incidence, and walks away at a 30 degree angle of reflection.
@johnsmith14742 жыл бұрын
Actually the light, in moving toward & reflecting from the water, takes every possible path. I need to reopen Feynman's "QED" to review the very simple and elegant explanation.
@anon65142 жыл бұрын
Calculus is like heavy machinery. It's really powerful but can take a while to get going.