Evaluating sin(15 deg) with three methods: kzbin.info/www/bejne/jajIlKSGr8yWbKM

When he says "nested square root", I thought he was saying "nasty square root", and I was still in full agreement

This is so satisfaying. I really enjoy these kinds of maths, playing with the numbers and the function properties

My teacher does the foil method instead of using the formula a^2 - b^2, which is a little bit confusing and longer to write, thanks for the shortcut!!

Can you always unnest a (singularity) nested square root this way?

2:15 for (2), you can use this quadratic equation to solve for the 2 numbers for the rational number under the square root to split into to create a perfect square: x^2 - Ax + (B^2)/4 = 0 where A is the rational number, which is 2 and B is the irrational number, which is sqrt(3), so x^2 - 2x + (sqrt(3)^2)/4 = 0 => x^2 - 2x + 3/4 = 0 solving this gives you the number which you use to split the rational number into, in this case, x = 1.5 and x = 0.5, so (2) becomes sqrt(1.5 + 0.5 - sqrt(3))/2 sqrt((sqrt(1.5) - sqrt(0.5))^2)/2 (sqrt(1.5) - sqrt(0.5))/2 and you can continue to solve this to get the answer in the video I haven't personally done a proof for this equation since my maths teacher gave it to us to use because it works basically all the time I've used it, maybe a proof for it would be nice at 7:36, you can add both of the equation on their respective sides and solve the quadratic equation, and you will get 6 and 2 as the answer (just in case you didn't know the actual answer yet) I'm unsure if you're allowed to use the quadratic equation in your country at this stage, let alone the version above, but mine does and we use it all the time

How cool is that!

The quickest way to verify that they're all the same is just to check that they're all positive and then square them all (although you still have to rationalize the denominator in the first one). What you did was something more, showing how to turn the first one into the second one and the second one into the third one without knowing ahead of time where you were going to end up.

Also you can do rad (2 (4 - 2 rad (3) ) , which is rad (2) * rad (4 - 2 rad (3 ), which still follows the rad (a+b - 2 rad (a*b) ) formula, the result is the same, rad(2) * (rad (3) * rad (1)) = rad(6) * rad(2)

In sec case you can just multiply top and bottom by √2 and then √(4-2√3) is equal to √(3-2√3 +1) =√((√3-1)^2) and becuase 2>√3 it is equal to √3 -1 so then multiply top and bottom by √2 and you have anser

the first one was ez but the 2nd one ..... let me think for over 15 years and I wouldn't have found some of those steps

He must edit these, as the board didn't erase itself at the very end😅

So, the third answer is the most simplified right? It is the only one that can be approximated by hand with only simple square root of small integer approximations.

When I was at junior school & middle school math is my lovest subject (lesson) but since at high school math is disappointment subject because until now there are annoying question and formula which too hard to understand!

oh yes continuity!

Extreme manipulation!

first