I like the sin triangle way better

Please make video a day life of yourself

*You should do a Lambert W triangle where the sides of the right triangle are W(x), W(2x) and W(3x).*

try cos triangle

@@mr.d8747 its not possible to do it algebraically

Seriously. People ask me all the time why I like math so much. I can never give an answer that I'd consider satisfactory.

I’ve never agreed with a statement so much

Math is a sandbox for logical reasoning. Unlike reasoning applied to philosophical questions(also an enjoyable endeavor) we can determine conclusively the accuracy of our reasoning in that the outcomes are known. One of the reasons why I like it. But it's a multifaceted appreciation for sure.

@hybmnzz2658 the kick in the discovery ~ Richard Feynman

@@Owen_loves_Butters im glad the math youre taught is like that. In the third world country i come from, we memorise most of the tricks and exactly write down what we memorised in the exam, then forget about it.

This is softcore ASMR 3b1b is heavy hard core ASMR💀

Glad you enjoy it!

​@@canyoupoop😂

@@blackpenredpen And the triangle itself turns out to be 30°, 60°, 90° right triangle.

​@@Jack_Callcott_AUguess check is ez

heartaches😃🤤

was something wrong there or what was that ?

@@Mr23143sir nothing was wrong, he just had some different outro plan

Oh, thanks for clarification then @@guy_with_infinite_power

This man just went ('-') /|\.

he might have realised he could have just used the law of sines (sinA/a = sinB/b = sinC/c)

Exactly. 3x = 90 degrees and angle x is the left angle in the figure. Trig identity says sin(2x) = 2 sin(x) cos(x). But by the figure, cos(x) = sin(2x). So sin(2x) = 2 sin(x) sin(2x) which means that sin(x) = 1/2. Quick and easy!

​@@gordonstallings2518 How do you know beforehand that 3x = 90 degrees? It's true that one can set the common value of the three sides of the equation to be 1 and discover quickly that this solution works. But there's no obvious way to show that 1 is the only common value that works.

Sin(x) is opposite over hypotenuse. And the sine of the smallest angle is the upright divided by the hypotenuse, which is labeled "sin(x)". The law of sines says that the sine of an angle divided by the opposite side length makes the same ratio for all three angles. So sine of the smallest angle divided by length 'sin(x)' is the same value as sin(90) divided by sin(3x). sin(x)/sin(x) = sin(90)/sin(3x). So 3x = 90, x = 30. @@flash24g

​@@gordonstallings2518 "And the sine of the smallest angle is the upright divided by the hypotenuse, which is labeled "sin(x)"." Nonsense. It's the length of the upright, not this divided by the length of the hypotenuse, which is labelled sin x. So this would only be valid if we knew that the hypotenuse is length 1, which we don't know yet.

@@gordonstallings2518 And where do you get sin(x)/sin(x) = sin(90)/sin(3x) from? What we have from the law of sines is sin A / sin x = sin (pi/2) / sin 3x where A is the smallest angle. We have not shown that A = x.

no , because then u will get 2x=2nπ + π/3 x=nπ + π/6 this is not the answer for every case where n is odd

@@prateeks6323 it is, he just needs to reject the negative "solutions", like in the video (the part 2sin(x) + 1 = 9).

@@prateeks6323 that's true, but it still finds one answer.

It's much simpler than that. The vertical side if his triangle is obviously the sine of the left hand angle. The bottom side is, likewise, the sine of the top angle. Therefore the one angle is twice the size of the other, and the only right-angle triangles with this property have angles of 30, 60 and 90 degrees.

Am I missing some easy way you got 4sinxcosxsin2xcos2x how is that much simpler

He always crosscheck the results.

Unless I don’t see the steps you skipped but sin(3x)-sin(x) is not sin(2x). Likewise sin(3x)+sin(x) isn’t sin(4x)

Ah! I can’t believe I didn’t see that even I worked out those values at the end. Nice!

You are right in what you say, but at no time is it said that x is one of the angles of the triangle, it is true that the results coincide, but only by coincidence (proposed manipulation of the values) of what was stated. That is why x=π/3+2nπ is also a solution, since x has nothing to do with the angle of the triangle. They coincide since if we call the angle of the left vertex ϴ then sinx=sin3x*sinϴ sin2x=sin3x*cosϴ dividing sinx/sin2x=sinϴ/cosϴ, this is possible if we assume ϴ=x sinx=sinϴ, ok sin2x=2sinxcosx=cosϴ, only possible if x= π/3. If the hypotenuse had been changed to sin5x, a solution as you indicate would be x= π/10≈0.3141596 But an approximate solution for this case is x≈0.4234166058162681

Although this does work out, it is not necessary for the circle to be a unit circle. sin(x), sin(2x) and sin(3x) are just numbers in the context of this triangle and the parametrization of a unit circle you provided used a dummy variable x (you could have used theta or 'a' or alpha or anything), which is not necessarily the same as the one in the problem. You could scale the triangle so it had a hypotenuse of 1 though, by scaling by 1/sin(3x), then it would be sin(x)/sin(3x), sin(2x)/sin(3x) and hyp 1. Then, for exists SOME value of alpha such that sin(alpha) = sin(x)/sin(3x) and cos(alpha) = sin(2x)/sin(3x). Not sure why would one do this though, since what @@blackpenredpen showed in the video is the "simplest" and pretty much the only way of doing this without unrigorous and baseless pattern matching. Your solution is not "Simple," it's not rigorous -enough- *at all* and it just happened to work out. Also, adding to what @@fisimath40 said, sin(5x) is also just a number and in the example they provided, your method doesn't even work.

Thank you, @fisimath40 and @hiimgood, for your comments. This "method" does not work for other values for the hypotenuse, as @fisimath40 pointed out. It is only valid based on the assumption that x is one of the angles. I was considering deleting the comment since it can cause confusion, but I realized that it could actually help avoid the same mistake that I made.

no

Maths is just the best

@@hareecionelson5875 i would have to agree

The most useless number in the equation

But if 4 equals 0 we have another solution.

Lol thanks!

​@@blackpenredpenI thought you said "because i..." to say that we may have some complex number solutions, haha

sin^2(x)+sin^2(2x)-sin^3(3x) is a third degree polynomial in sin^2(x), and it admits the roots sin^2(x)=0, sin^2(x)=1, as well as sin^2(x)=1/4, the last case is exactly x=π/6 up to an integer multiple of 2π. As the first two cases had been discarded, x=π/6 is the only solution if 0

If you do that, it's not a triangle anymore, but a mere point

He rejected that solution because it makes the sin(2x) edge have length zero

Exactly like this?

When you wrote tan^-1(x), are you referring to arctan(x)? If so, those are the exact same problem. Anyway, you can simplify that to x = tan(cot(x)), and you can use progressive calculations to find the solution, though it isn't very satisfying. Wolfram alpha doesn't have a solution.

I think that is going to be horrendous 😆

it's quite an abuse of notation i guess

That’s the def of a “differential”. You can also look up “total differential” in calc 3 to see the connection.

He is not a KZbinr but also he is a mathematician professor 😮