Timeline for Purpose Of Adding A Constant After Integrating A Function
Current License: CC BY-SA 3.0
8 events
| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| Jun 12, 2020 at 10:38 | history | edited | CommunityBot | Commonmark migration | |
| Dec 11, 2015 at 7:40 | comment | added | user104111 | What if we have a definite integral? | |
| Dec 26, 2011 at 18:38 | comment | added | Samuel Reid | I got this picture off of a university website, but for any sort of figure drawing, I use Adobe Illustrator CS5 for figures in all of my papers. Another way of thinking of the slope field is that it covers the plane with all of the possible "flow lines of the function", so if you have water running down a stream (think of this as from -x to +x), the water will run along the paths described by the slope field. Values for $C$ correspond to what particular path the function (or the water) is running along. | |
| Dec 26, 2011 at 18:31 | comment | added | alok | Right.I've just started with differential equations and this slope field is yet to make sense,however i will try to comprehend.By the way which tool do you use to draw slope fields?I'am sure that it'll come in handy when i get there. | |
| Dec 26, 2011 at 18:20 | history | edited | Samuel Reid | CC BY-SA 3.0 | added 23 characters in body |
| Dec 26, 2011 at 18:19 | comment | added | Samuel Reid | So, is there anything that I can add to my answer that you still have a question about? | |
| Dec 26, 2011 at 18:07 | comment | added | alok | I aggree.That's why i included a simple differential equation which i solved.i'am sorry.i took a long time to edit. | |
| Dec 26, 2011 at 17:56 | history | answered | Samuel Reid | CC BY-SA 3.0 |