I love that unuseful yellow circle

I am not a math person, but I love Andy's attitude and could watch his videos all day.

How exciting indeed

GOOD GOD, EVERYTHING WAS A TRIANGLE ALL ALONG

the type of questions you bring perfectly match my grade level. thanks. i can solve some tough probs now

Nice problem! I took a general approach to get R for arbitrary half circles with radius r. It goes as follows: x² + R² = (r-R)² x² + R² = r² - 2rR + R² → x = √(r² - 2rR) y² + (r - R)² = (r + R)² y² + r² - 2rR + R² = r² + 2rR + R² y² = 4rR → y = 2√(rR) Now as y = r + x, we get 2√(rR) = r + √(r² - 2rR) 2√(rR) - r = √(r² - 2rR) 4rR - 4r√(rR) + r² = r² - 2rR 6rR = 4r√(rR) |r>0 (6/4)R = √(rR) (3/2)R = √(rR) |² (9/4)R² = rR |R>0 (9/4)R = r therefore R = 4r/9 In your case r = 18 (half of 36), so R = 4·18/9 = 8

bro is so underrated, keep up the good work man appreciate it a lot

Man I love this guys videos! Stumbled upon them a few days ago now I cant stop lol

I wish you were my math teacher, you are so patient with the explainations and it is crystal clear, thanks !

I always liked math and it was the one subject I was good at in school but it has been years since i sat down and solved a math problem. It was fun to solve the problem along with you. Subscribed

For the people who are wondering, If you look at the point of contact between the green circle and the 36circle's circumference, there can be a perpendicular radius of the green circle drawn there. There can also be a perpendicular radius of the 36circle that can be drawn, since both are perpendicular to the same point, they coincide. I got this after a while of thinking and my brain is now tired.

Thanks for the work you put in to fashion each clear and concise attack you document. You're doing very good work indeed.

This puzzle was fun for me because - seeing all those tangent circles - I went off and did it with a circle inversion, which I always think is such a beautiful trick when it works. Although TBH it didn't magically make this into a quick easy problem.

This took me a very long time. I finally got it although I went around and around in a very convoluted solution. Your method was far more simple than mine. Please explain slower! I have trouble keeping up with your explanations, and it’s hard to stop the video at the right moments. Please pause a little between operations. Please! My age is the square root of 5,929.

Hola Andy, It can be shown that for any such figure exactly 4.5 R's constitute the length of the given radius. From this we have that the length of R is 36/4.5 = 8. Thank you so much for this problem which provided a rough challenge from the directions I took. The challenge plus you enthusiasm are much welcome in problem solving departments in education these days : )

Loved the ending thought process! Great work

I would love to know your process of thinking of a way of solving. Itd be great if you can explain how to approach these mathematical problems!

This was a good one. I was going down the same road with the two triangles and it was getting ugly, so I was thinking maybe it wasn't the right approach. Then I played the first few seconds of the video and you said it was a bear, so I just put my head down and pushed through. For semicircles of arbitrary radius A, the solution is R=8A/18.

It was great, Thanks for solving these kind of problems 👍

I feel how my classmates feel when I explain something and they say “I don’t understand”

U deserve a lot subscribers Keep going

I feel like I should be eating handfuls of paste after watching this. I stared at this for 20 minutes trying to get somewhere, and Andy explains it in less than 7 minutes. If I ever feel the need to feel dumb, this is where I come.

Love these videos. I subscribed, its worth it

GOod esplanations with out jumping crucial steps.. Good job - I enjoyed it :)

on 5:40 you could divide both sides by 9R to get 8=R

How do you know the center of the semicircle, the center of the green circle, and the point of tangency between those two circles are colinear points?

Eventhough your speed is Interstate, I am able to follow. Had you been my algebra-trig teacher and said "How exciting" a couple of times, I'd be so much more facile. But, here you are on KZbin and here I am a geometer without too much of algebra or trig, and yet curious. Let's see where this goes.

Where do you get these interesting geometry problems?

When you did draw a line from the center of the left semi circle to the collision point of the green circle and the left semi circle, how did you guarantee that the line crosses the center of the green circle?

really nice. I tried to do myself got stuck of course. thanks.

Tried to think of a solution in my head: Couldn’t 💀

Good question for my 15 year old students exam

How exciting! Where do you find these problems?

Where the f do you get these beautiful questions????

Its like a 14 15 year old Knowledge that's needed but a few l'oreille years to find the way to get into it

Right after 42 seconds, I was able to do it... My only doubt was if it is possible for a segment from centre of the semicircle to the circumference also passing through the centre of the smaller circle

As an engineer I can confidently state that R < 36

Me being a doctor watching this at 2Am. This is just awesome.

I was totally stumped by that first part, solvin for X in terms of R

how would you solve for the radius of the other circle?

45 years ago when I was 17, I could have solved this problem. Now I am just old and stupid. Nice work youngster!

I did it different. I used sohcahtoa, pythagoras theorem, b²-4ac, and the quadratic formula without using Y and I got a similar amswer to you

I made a start but I just went off at a tangent.

Could someone please do "how exciting" compilation 😂

What was the point of the yellow circle then? was it just to distract us from directly applying this method? or is there an easier way to do this problem using the yellow circle?

No joke, I looked at it and immediately thought "well it has to be slightly smaller than a quarter of 36 so I bet it is 8" and it just so happened that my hunch was right.

4:14 how do you know the red portion is half of 36?

thinking outside the box..err.. circle, one this one

If I watch all these videos a million times I’ll be able to do them too without even thinking about it.

5:41 you could just divide by 9R and so you will get that R = 8 because R can't be 0

I'm thinking the yellow circle is a separate problem (much easier). It's radius is 18*(1-1/√2).

why center of a green circle, "endpoint" and point of a vertical half radius is on the same line?

At 72R = 9R^2 you could just divide by 9R on both sides, resulting in 8 = R

Hi good job on solving the problem but pls correct me if I’m wrong when u got 72R=9Rsquared could u of just divided by R to get 72 =9R then divided by 8 to get 9=R

This was a very nice problem!! I enjoyed it A LOT!!

Outstanding.

i dunno why but when you said the radius was r+18 i laughed saying ah the problem is rated R :P

How do you know the red portion is starts at the midpoint of the semicircle?

now this was sooo good... and it took youtube only 7 months to recommend it to me 😂😂

How exciting! I love this guy!

How does a line from centre of semicircle to green circle is coincidental to centre of green circle

In the first part of this problem, how do you know the line from the tangent point of the green circle going through the green circle's center also goes through the center of the semicircle?

that yellow circle will not haunt me xD

GREAT JON ANDREW!!! WOOOOOOOOO LETS GO BABYYYYY

Regarding the line at 0:30. How do we know it goes through the center of the green circle? I wouldn't have assumed that, so I'm a bit disappointed that it wasn't explained.

How do you know that the second hypotenuse is R+18? How do you know it bisects the exact point that the circles are tangent to each other?

wen you got to 72R=9R^2 m first tougt was to just divide both sides by R, giving 72=9R, so R=72/9=8

I could not see an algebra solution. Did it graphically. The center of the circle is found as you start at zero for R and increse it. You have 3 curves that eventually meet at a single point as R approaches 8. The 3 curves are x=R, the upper curve circle as the radius is 18-R and the lower circle as the radius is 18+R. Did it quick and dirty on a TI-84. Equation 1, the upper circle ... sqrt((18-R)squared-X squared)) +18.... equation 2, the lower circle .... sqrt(18+R)squared-(X-18)squared).... equation 3 is just a vertical line for x=R ..... (X-R)*10000. Think of as R gets bigger the alowable center position of the circle is restricted by needing to be R distance from the y axis and R distance from the upper circle and R distance from the lower circle. The allowable center point is inside the 3 curves and as R increase you get one allowable point as R gets its maximum value of 8.

The next level question, Find the radius of the yellow circle

Went to solve this on my own before watching the video, and was proud to find the answer was 9(2-sqrt2), until i came to the video and realized I found the radius of the YELLOW circle, not the green one.

This is why i was a mathlete. Yes...how exciting

Thank you so much I enjoyed it

How do you know that the centre of green circle, Center of semi circle, and point where curved surfaces of green circle and semicircle touched are all in the same line?

x is not equal to y - 18. Because both horizontal tangents are not the same. So y is less than x+18.

I wouldn't have the nerves. I would just draw and measure with a ruler...

This may sound like philosophical bullshit, but your math videos actually help me cope with my executive dysfunction from ADHD - I "just" need to break down every task/problem into small enough parts that I can solve. Everything can be broken down into smaller steps and at some point the step is small enough for me to know the solution. Thank you :-)

Very good explanation

When you draw the orange radius, length 18, how do you know it touches the tangency point of the 36 semi circle & the green circle? Or is it coincidence, or close, but meaning that it doesn't matter?

I am confused with just one aspect. How do You know that first line Andy draw connect "center" of big circle with point where big circle touches green circle? And, no matter how small green circle is, If You draw line from center of vertical line to point where where both circles touch, it will always go through center of green circle?

When you got to 36(2R)=9R^2, why did bother subtracting 72R and factoring? Just divide both rides by R to get 72=9R, which gives R=8.

where do you find these

How do you know the radius you drew of the semicircle goes through the center of the green circle?

I have a question that why the red line part in the end is 18 so certainly

Clever! How, though, do you know that the line segments starting at the origins of the two large semi-circles go through the center of the green circle. I'm glitching on that point. Thanks!

bro almost forgot to say how exciting

What's the radius of the orange circle? 😛

I can not figure out the proof of orange and yellow line is a line. How to accept 18 bigger half circle yellow radius intersect green circle's center?

Man who called Andy teaching basic math in 6 minutes

When you are at 72R = 9R^2, why not divide both sides by 9R? You end up getting R=8 and the whole thing is a little simpler.

6 min is "potentially too long" for people? Amazing we're still a competitive country at this point.....

Loved it

It took me a while but I finally got it right! 😭♥️

How do you prove the hypotenuse is R+18? What if there's a small gap between radius R and semicircle?

2here did the red 18 come from?

What's the significance/meaning of the R=0 solution though?

That was just great

How exciting indeed.

How are you able to assume that the line equal to r+18 when solving for the y variable is indead a straight line simply bevause its a tangent for both curves? Im having trouble figuring out how you would know that.

now what's the radius of the yellow circle?

Nice one , lazy query , is the yellow radius solvable .