A community for students.
Here's the question you clicked on:
 0 viewing
anonymous
 3 years ago
Find the derivative f'(x)
anonymous
 3 years ago
Find the derivative f'(x)

This Question is Closed

anonymous
 3 years ago
Best ResponseYou've already chosen the best response.0I got  integral sign ln (t^2 + 1) is that correct?

agent0smith
 3 years ago
Best ResponseYou've already chosen the best response.2^Close Similar to the last one, except with two limits... similar process though. The derivative cancels out the integral, then you just basically plug in the limits and differentiate the limits \[\Large \frac{ d }{ dx } \int\limits\limits_{t}^{1}\ln (t^2 +1) dt =\] \[\Large = \left[ \frac{ d }{ dx }(1) \right] \ln( (1)^2 + 1) \left[ \frac{ d }{ dx } (t) \right] \ln (t^2+1)\]

agent0smith
 3 years ago
Best ResponseYou've already chosen the best response.2Wait, is this finding f'(x)? That t limit... is that meant to be x? This would just be zero.

terenzreignz
 3 years ago
Best ResponseYou've already chosen the best response.1Much more interesting if it were an x instead... here... \[\Large \frac{ d }{ dx } \int\limits\limits_{\color{red}x}^{1}\ln (t^2 +1) dt =\]

agent0smith
 3 years ago
Best ResponseYou've already chosen the best response.2\[\Large \frac{ d }{ dx } \int\limits\limits\limits_{x}^{1}\ln (t^2 +1) dt =\] \[\Large = \left[ \frac{ d }{ dx }(1) \right] \ln( (1)^2 + 1) \left[ \frac{ d }{ dx } (x) \right] \ln (t^2+1)\]

terenzreignz
 3 years ago
Best ResponseYou've already chosen the best response.1perhaps something like this? \[\Large \frac{ d }{ d\color{red}t } \int\limits\limits_{t}^{1}\ln (t^2 +1) dt =\]

agent0smith
 3 years ago
Best ResponseYou've already chosen the best response.2@onegirl that one with t will just be zero. Since you're basically taking the derivative of a constant... zero.

anonymous
 3 years ago
Best ResponseYou've already chosen the best response.0okay and that is what my original problem had a t but okay thanks!

anonymous
 3 years ago
Best ResponseYou've already chosen the best response.0thats what confused me when i was looking at this video he was substituting x and i had a t so i didn't know what to do http://www.youtube.com/watch?v=PGmVvIglZx8

agent0smith
 3 years ago
Best ResponseYou've already chosen the best response.2Unless it's \[\Large = \left[ \frac{ d }{ dx }(1) \right] \ln( (1)^2 + 1) \left[ \frac{ d }{ dx } (t) \right] \ln (t^2+1) =\] \[ \Large = \frac{ dt }{ dx }\ln (t^2+1)\]

terenzreignz
 3 years ago
Best ResponseYou've already chosen the best response.1implicit? It's tempting, but I'm more inclined to believe a typo.

agent0smith
 3 years ago
Best ResponseYou've already chosen the best response.2Yeah, i've only ever seen these types when one of the limits is an x, and it's dt. Not a t when it's dt.

terenzreignz
 3 years ago
Best ResponseYou've already chosen the best response.1How much simpler this would be were it an x as the lower limit instead \[\Large \frac{ d }{ dx } \int\limits\limits\limits_{x}^{1}\ln (t^2 +1) dt =\] Switch the limits, and put a negative sign... \[\Large \frac{ d }{ dx } \int\limits\limits\limits_{1}^{x}\ln (t^2 +1) dt =\]

agent0smith
 3 years ago
Best ResponseYou've already chosen the best response.2If it is an x then \[\Large \frac{ d }{ dx } \int\limits\limits\limits\limits_{x}^{1}\ln (t^2 +1) dt =\] \[\Large = \left[ \frac{ d }{ dx }(1) \right] \ln( (1)^2 + 1) \left[ \frac{ d }{ dx } (x) \right] \ln (x^2+1)\] \[\Large =  \ln (x^2+1)\]

terenzreignz
 3 years ago
Best ResponseYou've already chosen the best response.1Of course, the negative sign may cross the dy/dx, the derivative of a negative is the negative of the derivative \[\Large \frac{ d }{ dx } \int\limits\limits\limits_{1}^{x}\ln (t^2 +1) dt =\] And here, you can just go ahead and use the first fundamental theorem of Calculus... \[\Large \color{green}{\frac{d}{dx}\int\limits_a^xf(t)dt=f(x)}\] \[\Large \ln(t^2+1)\]

anonymous
 3 years ago
Best ResponseYou've already chosen the best response.0Hmm..i'll check on with my teacher on this one..

agent0smith
 3 years ago
Best ResponseYou've already chosen the best response.2@terenzreignz shouldn't it be an x^2+1 in your last step?

terenzreignz
 3 years ago
Best ResponseYou've already chosen the best response.1cr*p typos are contagious :D should really stop relying on copypaste XD \[\Large \ln(x^2+1)\] Thanks for pointing that out :)

agent0smith
 3 years ago
Best ResponseYou've already chosen the best response.2Yeah i made a few above, with all the damn x's and t's...

terenzreignz
 3 years ago
Best ResponseYou've already chosen the best response.1I only did go online for a few giggles... lol  Terence out

anonymous
 3 years ago
Best ResponseYou've already chosen the best response.0so @agent0smith you think its a typo? and that it should be with an x and not a t?

agent0smith
 3 years ago
Best ResponseYou've already chosen the best response.2Probably, cos it just doesn't look right with a t. But @terenzreignz you don't need to have the x as a lower limit and pull out negatives etc... the way i showed gets the same result (and you can shortcut it since you know the derivative of the upper limit will be zero, leaving 0  ln(x^2+1) since x was the lower limit)

anonymous
 3 years ago
Best ResponseYou've already chosen the best response.0okay thanks for the explanation

agent0smith
 3 years ago
Best ResponseYou've already chosen the best response.2No prob. But also @terenzreignz i guess it makes sense to switch limits and change the sign too.
Ask your own question
Sign UpFind more explanations on OpenStudy
Your question is ready. Sign up for free to start getting answers.
spraguer
(Moderator)
5
→ View Detailed Profile
is replying to Can someone tell me what button the professor is hitting...
23
 Teamwork 19 Teammate
 Problem Solving 19 Hero
 Engagement 19 Mad Hatter
 You have blocked this person.
 ✔ You're a fan Checking fan status...
Thanks for being so helpful in mathematics. If you are getting quality help, make sure you spread the word about OpenStudy.