❤︎² Gaussian Elimination.. How? (mathbff)

damn, never knew i would be interested in watching math after i graduated.

candanaci

I guess anything can happen in 2020, even a mathbff video

nishantmittal

I'm a computer science student... And I'm still watching this.
We're all here for a reason though.

hemanthkumar-xqvd

I wish I had this explanation 20 years ago when I was studying mechanical engineering.

Last but not least, I'm glad to have you back!

Weissenschenkel

Oh man, I owe you a huge thanks, this channel was instrumental in my success in calculus back in college. Im glad to see you’re still making videos, the examples you give make the all the options for a problem solution clear and easy to understand

runnerup

The most important lesson here is to respect the process.

SIGPTPOC

If only I had a teacher like you growing up ❤️

waskhan

where was this 4 months ago when i failed precalc

jarred

I can't learn when I'm blushing the whole time...

davidvaquerano

You left me like my father did: without a word of warning, and now you're back trying to teach me stuff.

mcheezy

I have graduated from uni with a master levels in ChemEng, why am I here 🥰

pipturbine

Very enjoyable video but I don't know why I keep cracking up every time Janel speeds up and the video goes 😂

cheshirecat

How did you change the second row? from 3x + 2z = 19 3:35 into x + 3y + 2z 4:05

AxelSorr

I love your mirrored writing 😍 also cool vid, haven’t solved matrices for like ten years now, ever since I left college.

yesitsmesisco

I don't need to know any of this, done with my studies... You probably know why I am here.

ReaLRazZ

Hey congrats on your return, welcome back! Hope you continue uploading 🙏 You really helped a lot of us in highschool and now we're in college! Thanks!

randelcarpio

welcome back! thanks for all the help you gave me!

orenkrimchansky

Back here after a long time but this was one of the channel which helped me through highschool and develop my passion for mathematics. So thank you for that and I hope you are doing well 😺

esto

After reading Derbyshire's Prime Obsession several times and still having little idea about the amazingness of mathematics, your title caught my attention as I remember this portion of the book on the "The Montgomery-Odlyzko law: The distribution of the spacings between successive nontrivial zeros of the Riemann zeta function (suitably normalized) is statistically identical with the distribution of eigenvalue spacings in a Gaussian unitary ensemble. Hopefully this is remotely related and by extension hints that there is yet hope in better understanding the world of numbers/NUM3ERS...

plazguitar

I'm happy that you still teaching, stay safe

gopinath