Congrats Stephen! I am really happy for you and I am glad my videos were helpful! Good luck on your future endeavors and thank you for your great support!
That is great! Happy to help. Make sure to sign up at www.engenieer.com for some free practice problems and tips on how to tackle the FE exam! Good luck with your studying!
Hey Genie!, I was wondering if you plan to cover thermodynamics and or materials science? I've loved your videos a lot and you've helped me so much as I continue to study for my FE in October.
Hello Saul, I will cover some materials science, but I am not sure if I will cover thermodynamics, I am still thinking about it 😂. Anyways, make sure you sign up for free practice problems. Thank you for watching and for being here! Good luck with your exam!
@@Genieprep Haha I understand! Either way, you are helping not only I, but many with the FE. Thank you!!! How do I sign up? I would love free practice problems, I am taking my Mechanical FE.
@@CodSock That is great to hear! I actually have practice problems for ME as well, so you can go to my website, www.engenieer.com, scroll down to the bottom and enter your email. Thank you for your great support 😊
Numeric integration is what we use to set up the concepts for integration in general, with Riemann sums as the first principles, and the coarse estimate for area under a curve. There are also enhanced methods like the trapezoid rule, the midpoint rule, and Simpson's rule that do much better. In a rank order from least accurate to most accurate, the methods are as follows: 1. Endpoint Riemann sums of both kinds 2. Trapezoidal integration that averages the two Riemann sums. 3. Midpoint rectangles 4. Simpson's Rule, that estimates curvature and approximates it with parabolas.
Thanks!
Thank You, Thank You, Thank You for the great videos. I took the FE last week and passed. Your teaching techniques are excellent. You are the best!!!
Congrats Stephen! I am really happy for you and I am glad my videos were helpful! Good luck on your future endeavors and thank you for your great support!
Just dropped in to say thank you! I took it last Saturday and I passed it.
JP Congrats and thank you for your support and thank you for sharing this with me! I am really happy for you. Good luck on your future endeavors!
Please we want more math FE problem
Thank you so much for this tip. I was having problems with this math problems
That is great! Happy to help. Make sure to sign up at www.engenieer.com for some free practice problems and tips on how to tackle the FE exam! Good luck with your studying!
Thank you!
Thank you
i got this on my FE exam!!
It is very common on the FE exam! Thank you for sharing that Crystal and for watching! I hope your studying is going well!
Hey Genie!, I was wondering if you plan to cover thermodynamics and or materials science? I've loved your videos a lot and you've helped me so much as I continue to study for my FE in October.
Hello Saul, I will cover some materials science, but I am not sure if I will cover thermodynamics, I am still thinking about it 😂. Anyways, make sure you sign up for free practice problems. Thank you for watching and for being here! Good luck with your exam!
@@Genieprep Haha I understand! Either way, you are helping not only I, but many with the FE. Thank you!!! How do I sign up? I would love free practice problems, I am taking my Mechanical FE.
@@CodSock That is great to hear! I actually have practice problems for ME as well, so you can go to my website, www.engenieer.com, scroll down to the bottom and enter your email. Thank you for your great support 😊
enGENIEer Done and done! Thank you for the content! Keep them coming you’re great at explaining things
Could you please explain numerical integration?
Numeric integration is what we use to set up the concepts for integration in general, with Riemann sums as the first principles, and the coarse estimate for area under a curve. There are also enhanced methods like the trapezoid rule, the midpoint rule, and Simpson's rule that do much better.
In a rank order from least accurate to most accurate, the methods are as follows:
1. Endpoint Riemann sums of both kinds
2. Trapezoidal integration that averages the two Riemann sums.
3. Midpoint rectangles
4. Simpson's Rule, that estimates curvature and approximates it with parabolas.
you can save a lot of time of you use the FE handbook formula