HOW EXCITING🔥🔥🔥🔥🔥

I’ve never seen someone so excited to solve the area of shapes

I can't remember ever learning that an inscribed triangle along the diameter is a right triangle, but it makes sense. That's the conceptual step I was missing.

This guy is such a G. He's genuinely excited to just do geometry all day, and in such a simple and zen way we can follow.

The last time I needed to solve problems like this was around 15 years ago, but i still come here and try to solve these once in a while. The way you teach and explain is so good! Kudos for not only keeping students challenged, but people like me as well!

Gonna be honest I just assumed they had areas of 1,4 and 9 because of the Fibonacci sequence

I’d also assume the other unstated (but visually implied) given was that the arc intersected exactly at the lower left corner of the pink square. There’s nothing that says it is drawn to scale, but I don’t see a way to solve it without that implied corner contact variable. Good stuff.

I can only be gay for Andy

Thank you so much for the great content! As one who works as a math teacher, your content has been a huge inspiration on how to make challenging and fun puzzles!

I love how well made the puzzle is; so simple yet so many straightforward steps to solve it. Would buy a book full of these

I never comment. Never subscribe. But you are crushing it. I save all of the problems that involve basic algebra geometry and algebra 2 concepts for my high school students. Andy Math out here differentiating instruction for me. God bless you and your family

Love your videos, doing these things with you are one of my favorite activities. Please take care of your own health and don't overdue with the videos and or any other job. Love you.

I like that you explain how to solve the problem very succinctly and clearly.

I cant believe this channel does not have more subscribers! Im am so glad i found you in my algorithm

I like the way you solve problems. Quicker and much more exciting than the other youtubers. Wish you will reach a million subscriber this year 😊

love all you great videos Andy! thank you very much! :)

I love watching these. I'm hoping to remember some of it when I need it later!

Mind blowing! absolutely loved it.

Your videos really helping me for my Olympiads =)

Such an elegant solution with whole numbers.

I really love your videos! they are fun to watch

You are just brilliant at explaining this stuff!

Seeing someone solve things like this perfectly is so satisfying 😭

I love this channel. Would love to see a good explainer/refresher on exactly how integrals are solved, particularly when doing u substitution with going from dx to du. 😊

At each equation found you can feel that it makes he happier 😂

It’s been 2 plus decades doing this and enjoyed. I had to pause to get my memory going 😂

Very nicely done!

Beautiful! 🔥 Wish my math lessons were this intriguing when I was a youngster !

Who made bro so high and mighty in mathematics 😭

I like that you always go for geometry problems that can be solved by high school level mathematics yet are still challenging.

I remembered how to form that first right triangle but didn't figure out the step to form the similar similar smaller ones. Cool stuff!

Very simple and straightforward explanation 👌

Fun fact, although is only a small sample, those squares apear in representations of the Fibonacci sequence.

Seeing this video reminded of my college days and learning of a square with negative dimensions. I think veritisium made a video about real life shapes that exist as the number i. Great content! Keep it up brother.

This is an exiting classic!

Merci pour ces vidéos, je suis impressionné par la facilité dont résout ces problèmes

I’m a healthcare professional and your videos fill the void of math in my field.

I love how clear his explanation is. No unnecessary talking so that even a non-native speaker who always sucked at math can follow easily!

Thank you for revising all concepts sir❤

You can do this without the semicircle or triangles. You do, however, have to infer that pink is smaller than purple.

This guy helps me with geo better than any tutor

You got as much views as your subscriber count in just 20h, wow ! This month has made your channel so viral: you've got your 2 most viewed video just this months. How insane ! Congratulations ! 🎉 Keep up the good work like that! 👍

Im gonna have test from plane geometry soon, this is actually gonns be pretty helpful (we do these kinds of exercises) 🔥🔥

I have an exam today, and they ask a lot of area type geometry questions, I have been following you for a long time, if I get atleast one question that have concepts that you used, all Credit goes to you❤

Another video from my favorite math teacher youtuber

Interesting… at a glance, I wondered if those were the proportions, but assumed it wouldn't be so simple!

I’m proud that I found you before you reached a million subs (which I know for sure will happen!)

An alternative way to solve this problem:trace a line beetwen the center of the semicircle and the point where the semicircle intersect the lower left corner of the smaalest square and apply the pitagorean theorem în the right triangle.

It’s fun when you can approximately do it by eye and assumption of whole numbers, but the correct algebraic method is interesting to follow along

I did it a different way, label lengths of the squares from largest to smallest as a,b,c. Then we can create a set of equations a+b = 5 (1) b+c = a (2) To get a third equation we can take the point where the corner a is on the semicircle and use pythagoras, noting that the radius is r = 2.5: b^2 + (2.5 - c-a)^2 = 2.5^2 (3) add together (1) and (2) to get a+c = 5 + a - 2b = 5 + (a+b) - 3b = 10 - 3b (4) substitute (4) into (3) to get b^2 +(3b-7.5)^2 = 2.5^2, ==> 10b^2 - 45b + 50 = 0, ==> (2b - 5)(b - 2) = 0 ==> b = 2, 2.5 if b is 2.5 then a = 2.5 and c = 0 so total area is 12.5 (trivial solution) , and for b = 2, we get a = 3 and c = 1 so total area is 14.

Its cool that i could just try guessing these squares and still get it right

I love it.. thanks for the good videos.. you are great..👍👍

Outstanding.

I understand the process as soon as i see the problem. Math is very interesting, exciting and challenge. I love to go back in time and wanna challenge these math problems again😢

i did this using the Pythagoras formula. you know the center of the circle is 2.5 from the edge. you can draw a triangle that goes from the center of the circle to intersection of the circle and the 2 smaller boxes, then down perpendicular to the base of the semi circle. this has sides 2.5 (hypotenuse is a radius of the circle), y and 2.5-y+x. we can substitute x = 5-2y into that last side then the side lengths into Pythagoras formula to give us a quadratic in y. solve that to get y = 2 or y = 2.5 giving x = 1 or x = 0 (which we can discard) and finish up getting the areas.

Very nice! However there exists another solution just using the assumptions you made. The equation at 2:13 assumes y is not 0, but for y=0 you do acually get another solution for the total area, being 12.5 square units.

Wow, amazing how these can be solved, when at a first glance it seems impossible! Love watching these to brush up on my math skills👍 Trigonometry is my favourite!👍

I solved it a different way. The radius of the semicircle is half the diameter, so r=5/2. Drawing a line from the center of the semicircle's base to the point at which the two smaller squares and the circle meet results in a line of length 5/2. Draw a line straight down from that point. You now have a right triangle with hypotenuse of length 5/2 and a height of y. Thanks to the Pythagorean Theorum, the base of that triangle, which goes from where that vertical line of length y touches the base to the midpoint of the semicircle's base, is the square root of the difference between (5/2)^2 and y^2. So the triangle's sides are sqrt((25/4)-y^2), y and 5/2. The length of the line extending from that triangle's right angle to the left edge of the semicircle is y-x. Therefore, the sum of y-x and sqrt((25/4)-y^2) is equal to the radius, which is 5/2. That's (5/2)=y-x+sqrt((25/4)-y^2) Solve for x, and you get x=y-(5/2)+sqrt((25/4)-y^2). Replace x with that expression in 5=2y+x, and you get 5=3y-(5/2)+sqrt((25/4)-y^2). Isolate the radical to get (15/2)-3y=sqrt((25/4)-y^2). Square both sides to get (225/4)-45y+9y^2=(25/4)-y^2. Move everything over to one side and combine like terms to get the quadratic function 10y^2-45y+50=0. Simplify to 2y^2-9y+10=0. Utilize our old friend, the quadratic formula, to get y=(9+-sqrt((-9)^2-4(2)(10)))/2(2). Simplify: y=(9+-sqrt(81-80))/4. Simplify: y=(9+-sqrt(1))/4. Simplify: y=(9+-1)/4. Conduct plus/minus operation: y=10/4, 8/4. Simplify: y=5/2, 2. y must be less than the radius, which is 5/2. Therefore, y can only be 2. Plug it in to 5=2y+x, solve for x, and x=1. Plug x and y into x^2+y^2+(x+y)^2 to get 14.

Cool! Here's how I solved it instead: - Grabbed a screenshot - Cropped the figure - Resized it so that the long side equals 500 pixels - Measured all sides, assuming that 1 unit = 100 pixels - Obtained measurements of 2.97, 2.03, and 0.95 units - Rounded up the measurements to the nearest integers, assuming that the author of the problem used integers - Obtained measurements of 3, 2 and 1 - Calculated the area of each square - Summed the areas

With math problems like this a lot of the time they're not to scale, so it's important to check, but it's satisfying that the solution to this one actually is what it looks like.

Truly an exciting answer

Approached this slightly differently. Made a right triangle from the center of the circle to where it intersects the pink and purple squares. One side is y, hypotenuse is 2.5 and the other side is the radius of the circle (2.5) minus the portion of purple square that sticks out past the pink square (y - x). So right triangle with sides y and 2.5 - (y - x) and hypotenuse 2.5. Plugged in 5-2y for x and solved the resulting quadratic form Pythagoras.Not quite as elegant but still worked.

Hola andy, me encantan tus videos, siempre me sorprende la forma tan sencilla en la que solucionas los problemas. Saludos desde Colombia ^^

Idk know why but i love to watch this

Dudes a natural

Another banger from Andy

I'm starting to really like your channel

Simply spectacular!!

Learned something new with your way of solving it. I managed to solve it but I assumed the smaller triangle intersect was right at the middle - Which I think it’s not a given so I’m considering my process luck 😅

My lord. That was insane dude

Excitingly waiting for next video😊❤

Fibonacci and Generalization - Building on your process, paying close attention to the triangle which is the sum of two smaller ones, with specific ratio: We have x. Next, we have y=x+x=2x. Next, we have x+y=2x+x=3x. Next, we have x+2y=3x+2x=5x. This is the Fibonacci sequence where each term is multiplied by x. The first, same value as second, term is missing (we have 1, 2, 3, and 5, instead of 1, 1, 2, 3, and 5 - which correspond to the "bite" missing from the "complete" rectangle). using s for side lengths and a for areas, each followed by 1-3 for smallest to largest squares. Let's call the 4th term: z. specifically: z=5x. so: s1=z/5, s2=2z/5, s3=3z/5. Squaring for area: a1=z²/25, a2=4z²/25, a3=9z²/25. Summing: Total area = 14z²/25. In your example, z=5, so the total area = 14*5²/25=14. For z=6, for example, total area would be 14*6²/25=20.16. For z=10, twice the 5, the result should be quadrupled: 14*10²/25=56 - and it is.

I wouldn't have thought to use a similar triangle proportion. Obscure methods are exciting.

I defined x as the length of a side of the smallest square like you did. Then I found ways to express the sides of the other squares with using x as the only variable: pink edge = x purple edge = 2.5-0.5x blue edge = 2.5+0.5x Then I put a right triangle between the bottom left corner of the smallest sqaure, the center point of the half circle and somewhere on the base line directly underneath that bottom left corner of the smallest square. The hypothenuse of that triangle would be identical to the radius of the half circle which is 2.5 and the other sides would be 1.5x and 2.5-0.5x (the purple edge). Using the pythagorean theorem I found x (the pink edge) to be 1 and substituting that into the above I found the purple and blue edges to be 2 and 3 respectively. 1²+2²+3²=1+4+9=14

I loved this.

you make it look so simple!

For all those saying, "its obvious" or "i could just visualise it" etc.... That means nothing in an exam as its not a proof. You will get next to 0 points just giving an answer or an explanation like that. You need to PROVE the answer. Yes you can guess but it doesnt mean its right. What if y isnt 2x? Thats why we have proofs.

Brilliant!

You're right, that WAS a fun one :D

Excellent vídeo. I dont understand english well, but It IS Very "visible" resolution and easy to follow The math😊

Completely forgot about that right angle theorem; there are just so many from Geometry to remember .. I kept thinking about trying to use Pythagorean theorem on the x and y blocks to find the radius of that semi-circle..

This is appeared in my recommendations and is the best recommendation that KZbin gave me today.

I solved this exercise by comparing the area of the entire rectangle 5*(x+y) minus the white area missing (x-y)^2 with the summatory of the 3 squares 5(x+y) - (x-y)^2 = x^2 + y^2 + (x+y)^2 then i replaced y = 5-2x and solved the cuadratic equation I have so much fun with your videos 💯💯💯

Pretty fun one!

You say x can’t equal 0, but I don’t see why not. You get the pink square with an area of 0, and the purple and blue squares each with an area of 7.75, for a total area of 12.5, making it a rectangle.

Was the triangle necessary? I could tell immediately that a lemgth of pink was ½ a length of purple; which means if diameter is 5, blue must be 3 and purple 2, thus pink 1. So it's 3×3+2×2+1×1=14 without the triangles... It's also a Fibionacci sequence, but I wanted to show my work. 😋

This is a good one.

i love him so much

I like your funny words, magic man

I love it!

Cool problem! I ended up with 14 by setting (2.5-y+x)^2 + y^2 = 2.5^2 based on where the semicircle overlaps with the pink square’s corner.

He never fails to disappoint 🔥🤑👌

x and y are the coords of the bottom-left corner of the pink square: Pink Square Length = 5 - 2y Pink Square Length = y - x y = (5+x)/3 But that same corner point also falls on the semicircle, which can be expressed as: (x-5/2)(x-5/2) + yy = 25/4 Substituting the first expression into the second and simplifying yields the quadratic: 2xx - 7x + 5 = 0 Which has solutions: x = 5/2 , x = 1

we could consider the case x=0 still a solution that represents the case when area of the little square vanish or gets smaller and smaller leaving only two equal symmetric squares, in this configuration the area is 12.5

For me it's purely visual, I saw that the length was 5 then found that the smallest square is one by one long with an area of 1 and simply counted how many small squares would be present in the shape we are given. Granted this doesn't work in every scenario but I got to the answer a lot quicker than the video does and got a good chuckle when me and the video arrived to the same conclusion.

I never thought I could be that much interested in maths 😮

I did it dividing circle and finding middle point, so left square bottom side is x, and x+ m = 5/2, right square side is (x+m+m), and smallest square side is x+2m-x= 2m, and second equasion is for radius where x^2 + (2m+m)^2 = (2.5)^2 and so on

Отлично объясняешь, спасибо 😊 thanx

Nice problem and nice resolution, bro! I've worked out the second equation by another triangle: the x²+y²=5² and used the the first equation squared as y²=(5-2x)².

Found 14 myself. Amazing problem, by the way.