Unrelated to the video, but I just wanted to say thank you for the Linear Algebra series, it helped so much! If you could do a whole series on ODE's, you would literally be the greatest to ever do it. Please and thank you :)
This subject is hard for me because the word problems are not realistic. For example, how can 1 side of a ladder move faster than the other side. In the real world universe in which we all live in, how can a ladder increase its distance from a wall at 1ft/s while falling towards the ground at 3/4ft/s. The only way is to increase the length of the hypotenuse (ladder) which the derivative is not taking into account.
![How to Solve ANY Optimization Problem [Calc 1]](http://i.ytimg.com/vi/cUMvwG7wvzM/mqdefault.jpg)
![How to Solve ANY Optimization Problem [Calc 1]](/img/tr.png)
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You are my Roman Empire
Thank you! My Calc BC final is tomorrow, this is a game changer for someone who's historically unskilled in related rates problems. :)
Bro started mewing 💀0:08
Like a true CHAD mathematician I thank him and am mewing right now as we speak
dude im going to fail my math test 😰
@@elspencicus7123 poor boya
Unrelated to the video, but I just wanted to say thank you for the Linear Algebra series, it helped so much! If you could do a whole series on ODE's, you would literally be the greatest to ever do it. Please and thank you :)
This is one of the best videos I have seen. Keep up the good work
tysm! quiz is tmrw and I needed a good review haha
omg thank you this has been the easiest video to follow
Instead of defrentaiting tan(@), you can make @=arctan(x/80) you will not need to find @ since it’ll be d@/dt
thank you so much for this video! very helpful! the ap calc ab exam is tomorrow and this is a subject i've struggled with all year, thank u!!
You freaking ANGEL!!! Thank you so much, this makes so much more sense! 🙏
does this apply to edgemaxxing?
I’m using pumpmaxxing
Just touch some grass
Can you PLEASE DO A VIDEO ON introduction to related rates with TWO EQUATIONS!? In calculus
Awesome! You finally remembered you have a youtube channel? XD
Great video. Thanks for sharing
This is awesome! Thanks!
This subject is hard for me because the word problems are not realistic. For example, how can 1 side of a ladder move faster than the other side. In the real world universe in which we all live in, how can a ladder increase its distance from a wall at 1ft/s while falling towards the ground at 3/4ft/s. The only way is to increase the length of the hypotenuse (ladder) which the derivative is not taking into account.
It's only at one "curve" in the chart. Eventually it turns into another curve and so forth.
Try it with a real ladder or ruler 📏. The ends move at different rates.
these questions require creativity, and its so hard for me dang
Thank you, keep making videos!
You worked the flashlight and runner problem using the tangent. Can you explain why this problem cannot be worked using sin(theta)?
cuz opposite angle is not constant i think
Thanks
Thank you, this is so clear.
Thank you.
For the second problem, would it be wrong to use sin? I got a different answer but the process still seems correct
Yes I think because of SOACAHTOA, which states that Tangent is Opposite/Hypotenuse while Sine = Opposite/Adjacent which would give u different answers
nevermind I have no idea what im talking about :(
@@uncle1804 haha thank you regardless
@@jessicaxin9460 check the angles i think the opposite isn't constant so u need tan
@@jessicaxin9460 I think its because 100 isn't constant and is only like that for that specific instant unlike 80 which stays at 80 at all times.
You’re amazing
For the second one i got -9/80, how come you times it by sec squared theta?
i also got that
deririvate of tanx is sec^2x
thanks!
Thank you
edging to this
Wtf
6:32 made me lose focus
lol need u