Thank you for your video. My test is in 48 hours. I'm a working professional and I was wondering where would I apply these math materials to my profession. It's sad that that these tests do not reflect what we need in real life.
So you get about 7-10 questions in the math section. You could get 5 questions on calculus or you can get 0 questions, it just really depends on your test. Thank you for watching and good luck with your studying!
Hello, so you are combining the steps but they are separate. The first step we did, is plug in the 0 in our function, when we did that, we got indeterminate form. Since we have indeterminate form, now we have to use l'Hospitals's rule. Using l'Hospital rule, you have to take the derivative of the nominator and denominator. The function of the denominator is x, so the derivative of x is 1. I hope this helps and good luck with your studying!
Thanks Genie! but why x is 1 not nearest number of x like 0.0001 for example?
Really easy explanation...great work...tojours!
The video sound is pretty good, beyond my imagination
Thank you for your video. My test is in 48 hours. I'm a working professional and I was wondering where would I apply these math materials to my profession. It's sad that that these tests do not reflect what we need in real life.
How many Mathematical questions are on the test? Calculus section?
So you get about 7-10 questions in the math section. You could get 5 questions on calculus or you can get 0 questions, it just really depends on your test. Thank you for watching and good luck with your studying!
Or use your Casio fx 115: set the limit to 0.000001 or as many zeroes you would like and your answer will be 8.
How would you set this up on the Casio?
Hey! how did you make the derivative of 0 into 1, I'm not following the g'(x) = 1 if g(x) was originally 0.
Javier Romero Murguia because you had x so you plug in 0. But x derivative is 1 so g(x)=x and g’(x)=1 and 1 is a constant not a variable
Hello, so you are combining the steps but they are separate. The first step we did, is plug in the 0 in our function, when we did that, we got indeterminate form. Since we have indeterminate form, now we have to use l'Hospitals's rule. Using l'Hospital rule, you have to take the derivative of the nominator and denominator. The function of the denominator is x, so the derivative of x is 1. I hope this helps and good luck with your studying!
this isn't on FE. thanks for the video, but viewers, save your time and study efforts and move on