Super hexagon for trigonometric II trigonometric ratios
Super hexagons are diagrams that help you memorize trigonometric identities, such as Pythagorean, reciprocal, product/function, and co-function.
There is something special about this hexagon
to help you remember some Trigonometric Identities
follow "around the clock" (either direction) to get all the "Quotient Identities":
Clockwise
tan(x) = sin(x) / cos(x)
sin(x) = cos(x) / cot(x)
cos(x) = cot(x) / csc(x)
cot(x) = csc(x) / sec(x)
csc(x) = sec(x) / tan(x)
sec(x) = tan(x) / sin(x)
Counterclockwise
cos(x) = sin(x) / tan(x)
sin(x) = tan(x) / sec(x)
tan(x) = sec(x) / csc(x)
sec(x) = csc(x) / cot(x)
csc(x) = cot(x) / cos(x)
cot(x) = cos(x) / sin(x)
and many more
Trigonometric identities Memorizing trick
Super hexagon trigonometry trick
trigonometry tricks
trigonometry formulas
trigonometry for ssc cgl
trigonometry ratios
trigonometry class 10
trigonometry tricks class 10
*class 10 trigonometry
trigonometry,
trigonometry formula
trigonometry trick
SuperHexagon
super hexagon
trigonometric identities*trig identities
trigonometry table
pythagorean identities problems, *pythagorean identities*identities
magical hexagon
magic hexagon
please likes share and subscribe to help this channel.
#SuperHexagon #trigonometrytrick #trigonometry #trigonometryforssccgl #TrigonometryTrick
Topic covered in this video
Trigonometry hand trick | trigonometric angles trick | Trigonometric palm trick | Trigonometry table Trigonometry angles Trigonometry hand trick Trigonometry palm trick Trigonometry trick maths trick how to find any angle in Trigonometry| trigonometry palm trick maths trick | maths magic | trigonometry | trigonometry trick | trigonometry functions | trigonometry ratio | sin cos tan |basic trigonometric ratios | graph of sinx graph of cosx graph of tanx| Integration | basic concepts of integration|integral calculus | concept of Integration | integration class 12 | class 12 Integration | power of Integration | integration by substitution | constant rule of integration | integration NCERT solution |ncert solution class 12 special angles trick| Trigonometric palm trick in Hindi
#magichexagon #magichexagontrick
All special angles
An important table of trigonometric angles
How to Memories trigonometric angles
trigonometry,trigonometry tricks,trigonometry formulas,trigonometry for ssc cgl,trigonometry table,trigonometry ratios,trigonometry class 10,trigonometry tricks class 10,class 10 trigonometry,trigonometry formula,trigonometry trick,superhexagon,super hexagon,trigonometric identities,trig identities,pythagorean identities,identities,pythagorean identities problems,infinity learn,sri chaitanya,iit,jee,neet,iit jee,cbse,
Пікірлер: 36
I’m so lucky that I have found this channel at the early stage of my classes. You are the best tutor ever. Thanks👌👍👍👍
It deserves to be called " Super Hexagon "... Wonderful presentation
I actually love this video. not only is the mnemonic extremely useful, but the repetition is great.
This is the best learning channel i've ever seen.👌💯
Best video ever on KZread to understand the all identities really well. Very good keep it up 👍👍👍
It shouldn’t be called Super Hexagon, instead it should be called Incredible, Extraordinary, Mindblowingly helpful, Super Hexagon.. Absloutely loved the video. Thank you so very much..😀👍
This really helped me when I didn't understand my modules. It's easy to understand and very simple.
I love this explanation. I clearly understand every concept. thank you
This was the most and best helpful method to learn trigonometry! Thank you so much guys , it's very useful!👍
Thank you very much! I can't express how grateful I am! ❤Love it so much! It's amazing how easily so many formulas can be learned!!!
I'm literally in love with this channel it's amazing, it solved a lot of my problems and now it's easy to learn... Thanks
This was so helpful! Thank you so much.
Very detailed explained 🔥 Nice 👍
Thank you so much. This teaching is greatly appreciated
Best channel to learn and understand all subjects. The channel will be much bigger in future
Awesome 👌👌 easy to understand all the concepts in this channel thank you. To don't memorise channel team great effort
Brilliant!
Thanks a lot ☺ a great video that learned all the formulas so well
Excellent explanation! Tremendous help.
@easymaths2022
Жыл бұрын
Thank you
Op!
Fantastic! Brilliantly simple and so useful. Great work!
@easymaths2022
Жыл бұрын
Thank you
Where was this wonderful lecture hidden???
Iam a med student but after watching this I think I may know more formulas then my engineer friends😂 .
thanks for the video, also good explanation!
@easymaths2022
Жыл бұрын
Thanks
YOU CAN USE THIS WITH DERIVATIVES! Though its a bit difficult to see, there are some noticeable patterns. Once i noticed these, I haven’t had trouble with these derivatives at all! You’re not gonna understand without writing it out. Its a bit complicated at first glance, but simple when you understand it. I just drew the hexagon (without the edges, only the lines in between. It looks like a x with a horizontal line) 1. Search up the trig derivative online. Write them down across a page. 2.Then under each function, draw the hexagon thing 3. trace a line from the trig to derivative using a different color pen. Do you notice the patterns? Take a moment to study it for yourself. Anyway, hopefully you understand this: I found these patterns: Obtuse angles create fractional derivatives, Accute angles create singular or multiplication derivatives Following the inner lines left into the center and out, will give negative derivatives. Following the inner lines right into the center and out, will give positive derivatives. Csc and sec repeat themselves in their derivatives. The derivative angles on the left are opposite of those on the right. Ex: following the inner lines, draw a line from tan to it’s derivative 1/cosx. The line went right in a obtuse angle, so it’s solution is a positive fractional derivative. Ex2: following the inner lines, draw a line from cot to it’s derivative -1/sinx The line went left in a obtuse angle, so it’s solution is a negative fractional derivative. The angle is opposite to tangent. Ex3: following the inner lines, draw a line from sin to it’s derivative: cosx. The line went right in a acute angle so the solution is a positive singular or multiplication derivative. Ex4: following the inner lines, draw a line from cosx to its derivative -sinx The line went left in a acute angle, so the solution is a singular or multiplication derivative. The angle is opposite to sinx. Ex5: draw a line from secx to to tanx (not the derivative) The line goes right first, and is a acute angle, so the derivative is positive multiplication. Since it is sec, it’s repeated. So, the derivative is Secxtanx. Ex6: draw a line from csc to cot (not it’s derivative) The line goes left first so the derivative is negative multiplication. Since its csc, it is is repeated. So the derivative is cscxcotx. Haha, I did not explain that very well, so I encourage you to try figuring this out yourself! The pattern could probably be simplified a bit. For instance, it’s better to say the top accute angles are singular while the bottom accute angles multiply something by themselves. But whatevs! I wish you the best of luck!
i wish i could have found something like this as a kid. thanks for this mam.
@easymaths2022
Жыл бұрын
Thank you
Thanks For This Outstanding Video 😍
@easymaths2022
Жыл бұрын
thank you
difficulty of understanding this is hyper hexagonest
Video on this topic has been made by don't memorize 8years ago😂
Excellent explanation! Tremendous help.
@easymaths2022
Жыл бұрын
Thank you