Differential Equation
Log in to post new content in the forum.
Topic / Topic starter | Replies | Views | Last post | |
---|---|---|---|---|
Differential Equation: Thermometer reading by Ace Robert Campos » March 3, 2016 - 12:08pm |
1 |
16,802 |
by Jhun Vert August 27, 2021 - 1:35am |
|
Differential EQNS: $y \, dx = \left[ x + (y^2 - x^2)^{1/2} \right] dy$ by Sydney Sales » July 14, 2016 - 10:53am |
8 |
685 |
by Sydney Sales November 18, 2021 - 12:59am |
|
Differential Equations by agentcollins » August 2, 2016 - 4:34pm |
1 |
415 |
by Lorepersn (guest) October 15, 2023 - 12:24pm |
|
Homogeneous equations- general solution by shaaarmiii » September 14, 2017 - 7:48am |
1 |
736 |
by fitzmerl duron August 15, 2021 - 11:51pm |
|
How to Solve Newton's Law of Cooling by AAA » October 26, 2019 - 5:30pm |
2 |
343 |
by AAA August 15, 2021 - 2:22pm |
|
differential equation: given $f(x)$, show that $f(x)$, $f'(x)$, and $f''(x)$ are continuous for all $x$ by Dutsky Kamdon » February 1, 2016 - 10:39pm |
0 |
32 |
by Dutsky Kamdon November 17, 2021 - 11:33pm |
|
Elimination of arbitrary constants: $y = Ae^{ax} \cos (bx) + Be^{ax} \sin (bx)$ by wackadoodle » July 6, 2016 - 8:41pm |
2 |
4,354 |
by wackadoodle November 18, 2021 - 1:03am |
|
Differential Equations: $(x - 2y - 1) dy = (2x - 4y - 5) dx$ by agentcollins » July 16, 2016 - 11:12pm |
7 |
7,489 |
by Allison914 (guest) June 1, 2022 - 10:20am |
|
bernoulli: $(y^4 - 2xy) dx + 3 x^2 dy= 0$ by Sydney Sales » September 5, 2016 - 12:19pm |
2 |
1,982 |
by Sydney Sales November 18, 2021 - 12:19am |
|
Differential equation by Helpme » August 21, 2019 - 2:13pm |
1 |
253 |
by amaziahbryceherrera August 15, 2021 - 2:25pm |
|
Newton's Law of Cooling by charles-d-nunez » October 1, 2023 - 10:00pm |
0 |
611 |
by charles-d-nunez October 15, 2023 - 9:54am |
|
Use the exponential shift to find the general solution. by Dutsky Kamdon » February 9, 2016 - 9:07pm |
3 |
4,583 |
by fitzmerl duron August 15, 2021 - 11:45pm |
|
differential equations: $y(9x - 2y)dx - x(6x - y)dy = 0$ by Sydney Sales » July 13, 2016 - 7:50am |
4 |
3,772 |
by Jhun Vert November 18, 2021 - 12:21am |
|
Integrating factors found by inspection by Flora Mae Ramir... » July 30, 2016 - 10:09pm |
2 |
4,666 |
by Nisha Alcantara August 15, 2021 - 2:23pm |
|
Families of Curves: family of circles with center on the line y= -x and passing through the origin by danedison » September 12, 2017 - 9:10pm |
2 |
22,567 |
by Infinitesimal August 15, 2021 - 2:21pm |
|
Differential equations: Newton's Law of Cooling by John Philip » September 20, 2019 - 4:46pm |
3 |
21,162 |
by Jhun Vert January 4, 2021 - 7:36pm |
|
differential equation: Determine whether a member of the family can be found that satisfies the initial conditions by Dutsky Kamdon » February 1, 2016 - 10:27pm |
0 |
485 |
by Dutsky Kamdon August 27, 2021 - 1:37am |
|
HOMOGENEOUS DE: $(x - y \ln y + y \ln x) dx + x(\ln y - \ln x) dy = 0$ by Sydney Sales » July 4, 2016 - 9:16am |
6 |
15,632 |
by Krug (guest) January 5, 2022 - 5:52pm |
|
DIIFERENTIAL EQUATION: $(x^2 + y^2) dx + x (3x^2 - 5y^2) dy = 0$ by Sydney Sales » July 16, 2016 - 4:45pm |
4 |
2,447 |
by Helpme November 18, 2021 - 12:16am |
|
Differential Equations - Elementary Application by agentcollins » August 21, 2016 - 10:17pm |
2 |
1,011 |
by Anonymous (guest) October 15, 2023 - 12:22pm |
|
diff eqn by Kennett Rubia » August 8, 2019 - 3:59pm |
1 |
183 |
by Jhun Vert October 15, 2023 - 12:25pm |
|
Differential Equation: $(1-xy)^{-2} dx + \left[ y^2 + x^2 (1-xy)^{-2} \right] dy = 0$ by The Organist » December 11, 2020 - 1:12am |
1 |
4,796 |
by Jhun Vert November 17, 2021 - 11:40pm |
|
differential operator please solve this problem by Dutsky Kamdon » February 9, 2016 - 9:03pm |
0 |
135 |
by Dutsky Kamdon August 27, 2021 - 1:35am |
|
Differential Equations: $[x \csc (y/x) - y] dx + x \, dy = 0$ by Sydney Sales » July 10, 2016 - 9:57pm |
2 |
7,611 |
by Sydney Sales November 18, 2021 - 1:01am |
|
Differential Equation: $ye^{xy} dx + xe^{xy} dy = 0$ by qwerty » July 17, 2016 - 8:28am |
3 |
3,670 |
by engeng November 18, 2021 - 12:54am |
Log in to post new content in the forum.