Differential geometry/manifolds, Optimization word problems in 3D, topology proofs.
2006-06-13 08:48:41
·
answer #1
·
answered by Anonymous
·
0⤊
0⤋
If you are going to start receiving this subject; the best approach is not to find out which one is the most difficult topic (that will only set you up in a negative way), but to go into class with the “I can do this" attitude will be more beneficial to you…believe me. Take it from somebody who applied this subject to the pharmaceutical field during university years –now that one is some horrible math people ;)
2006-06-12 16:58:02
·
answer #2
·
answered by Alchemist 2
·
0⤊
0⤋
Try going through the 150 pages of Spivak's Calculus on Manifolds book. That should give you a starting point on how hard Calculus can get.
2006-06-12 16:01:10
·
answer #3
·
answered by Eulercrosser 4
·
0⤊
0⤋
I had a real issue with 3-D calculus. Not rotating a 2D object about an axis. That was easy. But dealing with solids in space and finding the plane that is its derivative and string integrals and such. Everything in Calc I and II and differential equations was pretty easy, IMO.
2006-06-13 03:27:13
·
answer #4
·
answered by bequalming 5
·
0⤊
0⤋
High Order Integration Schemes
Integration schemes based on interpolation with polynomials of degree greater than 2 are seldom used in practice, but one area of application is in the fields of dynamic simulation, controls, and digital filtering.
2006-06-12 17:07:30
·
answer #5
·
answered by ideaquest 7
·
0⤊
0⤋
the hardest subject in calculus is the whole book as soon as you open it. :)
2006-06-12 15:38:11
·
answer #6
·
answered by Love Land 2
·
0⤊
0⤋
well, what level, and there is a class called Advanced Calculus, or Real analysis...the whole thing is tough, it is basically all properties of the real numbers, integration, and differentation, or essentially why and how integration and differentation works...its pretty cook ,but tough, so if you thought that just memorizing formulas were hard...know how and why those formulas work is tougher...
2006-06-12 16:00:26
·
answer #7
·
answered by matttlocke 4
·
0⤊
0⤋
Figuring out the equation for the Gradient of a surface.
2006-06-12 15:47:24
·
answer #8
·
answered by Anonymous
·
0⤊
0⤋
The most difficult for me (so far) is finding volume of regions on a graph that are revolved about a line or whatever
2006-06-12 19:25:53
·
answer #9
·
answered by artanisxvi 2
·
0⤊
0⤋
Truly understanding the completeness of the real line.
2006-06-12 15:40:14
·
answer #10
·
answered by ymail493 5
·
0⤊
0⤋