How does this guy know so much lol, so many topics I look up and he has a video on it explaining it easily. I have to say, you are doing a fantastic job and are clearly a very smart guy. Props!
I'm learning about logarithms in algebra 2 right now and this is really helpful and helps me get a really good insight on what e means. Thank you so much!
MR. Organic Chemistry Tutor, thank for a basic introduction to Euler number e and its overall application to growth/rate in real life. The number e is well known in pure and applied mathematics.
can someone explain to me: 1. In all videos related to Euler's number, they all start with this example of 100% growth/rate over some time (e.g. 1 year) and then split the rate/growth to 50% and 50%. What is the logic of this? When you say 100% interest to your x amount in 1 year, you do not mean x+ (50%*x) + ( x+ (50%*x)) *50%. This is not a 100% rate anymore but a more complicated higher rate. wtf? For me, it is not something I can relate to something I know. How should I think of it? 2. Also how this can be used on a simple example e.g. with some initial population of microbes and an arbitrary infinitely constant growth rate (e.g. 250% or 50%), an arbitrary initial and final population (e.g. 101 -> 10101 units), and an arbitrary time period (e.g. 4000 days)?
I think I managed to explain the 1st one to myself. In case anyone had similar wonder:s 1. there is no particular logic in this. This is just what is the procedure, and the bank thing is just an easy but not so successful (for me at least) way to explain it. There is nothing from everyday life that I can think of that you can relate to it. It is just the way that a population or a property/dimension/volume increases or decreases a. continuously (not district) b. with itself as a factor c. for a specific timeframe d. with a specific rate
But how exactly did we get the value of e If all the proofs that is shown in the vid is said to be closer and closer to e? How did we get the exact value of e at the first place?
we don't know the exact value of e, just as we don't know the exact value of π . Some guy in history thought it would be cool to divide the circumference of a circle by its diameter. Turns out, it's not an exact nr, and the bigger the circle is, the more digits of π he discovered. Another guy in history did the same thing, but instead of the whole circle situation he spent his time with the finance problem. He used bigger and bigger numbers and found that the sequence is approaching a limit. This limit is e. We did not "get the exact value of e" that the sequence is approaching, we just discover more and more digits of it by using bigger nrs in our calculus
When u say 100% interest twice a year or four times a year u mean 50% interest twice a year, 25% interest four times a year, right? Since if you got 100% interest twice a year starting with 1$, you would have 4$ after the first year
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early
How does this guy know so much lol, so many topics I look up and he has a video on it explaining it easily. I have to say, you are doing a fantastic job and are clearly a very smart guy. Props!
You are the reason why I am doing amazing in grade 12 math.
I'm learning about logarithms in algebra 2 right now and this is really helpful and helps me get a really good insight on what e means. Thank you so much!
MR. Organic Chemistry Tutor, thank for a basic introduction to Euler number e and its overall application to growth/rate in real life. The number e is well known in pure and applied mathematics.
Sir, I owe you a lot.. Imagine an anglophone schooling in a francophone country... If not for your lessons life wouldn't be easy at all
Same for me, i learn my maths in an anglophone country and I see myself in a francophone country same maths different steps or methods
This is so true I can understand a lot from it, rates and euler formula make so much sense and meaning, I get it thank a lot. Love you much.
Hi sir, This is vikram from India,
I need this type of Mathematical tricks. Do video on zero factorial by using advanced Mathematical methods.
He inspired me to create quality tutorials
what software do you use
@@grantgino1139 I use explee, video scribe and Microsoft note.
Where does "e" come from: It from a space right between "D" and "F" remember... Now that I solved that mystery, I still need to find my remote.
LMAOOO THIS COMMENT MADE MY DAY
At 1:21, where does the term “1” come from? As in “A = P (1…”. What does the 1 represent in reality? Why is it there?
1:32 t is the number of ears
More basic Algebra please :) y=mx+b
This guy is a master
Thanks!
G 194
note: 9:54 the slope and area of e^x is same as y
Still searching for videos on vectors and mechanics and dynamics as well
can someone explain to me:
1. In all videos related to Euler's number, they all start with this example of 100% growth/rate over some time (e.g. 1 year) and then split the rate/growth to 50% and 50%. What is the logic of this? When you say 100% interest to your x amount in 1 year, you do not mean x+ (50%*x) + ( x+ (50%*x)) *50%. This is not a 100% rate anymore but a more complicated higher rate. wtf? For me, it is not something I can relate to something I know. How should I think of it?
2. Also how this can be used on a simple example e.g. with some initial population of microbes and an arbitrary infinitely constant growth rate (e.g. 250% or 50%), an arbitrary initial and final population (e.g. 101 -> 10101 units), and an arbitrary time period (e.g. 4000 days)?
I think I managed to explain the 1st one to myself. In case anyone had similar wonder:s
1. there is no particular logic in this. This is just what is the procedure, and the bank thing is just an easy but not so successful (for me at least) way to explain it. There is nothing from everyday life that I can think of that you can relate to it. It is just the way that a population or a property/dimension/volume increases or decreases
a. continuously (not district)
b. with itself as a factor
c. for a specific timeframe
d. with a specific rate
Very nice n Remarkable VDO THANKS
But how exactly did we get the value of e
If all the proofs that is shown in the vid is said to be closer and closer to e?
How did we get the exact value of e at the first place?
we don't know the exact value of e, just as we don't know the exact value of π
. Some guy in history thought it would be cool to divide the circumference of a circle by its diameter. Turns out, it's not an exact nr, and the bigger the circle is, the more digits of π
he discovered. Another guy in history did the same thing, but instead of the whole circle situation he spent his time with the finance problem. He used bigger and bigger numbers and found that the sequence is approaching a limit. This limit is e. We did not "get the exact value of e" that the sequence is approaching, we just discover more and more digits of it by using bigger nrs in our calculus
But how does the first explanation for e work with numbers bigger than 1?
Ty man, u've saved me as always
When u say 100% interest twice a year or four times a year u mean 50% interest twice a year, 25% interest four times a year, right? Since if you got 100% interest twice a year starting with 1$, you would have 4$ after the first year
Yes
😵
Thanks
Thank you!
So ...
1to the power of infinty 》e
#logarithm #log #e #euler #eulernumber
Sir I want to talk about next indices.
Whats E?
A letter in the alphabet
Nice
#ln #naturallogarithm
Can anyone solve these Do these for me?
noice
ua-cam.com/video/UBX8MWYel3s/v-deo.html
Math?! MATH?!
*Maths. There! You have been corrected. 🙂
Wow 😯😯😯😯😯😯😯
hes so sexy