differential equation: Determine whether a member of the family can be found that satisfies the initial conditions |
Differential Equation: Application of D.E: Population Growth |
Differential Equation: Application of D.E: Newton's Law of Motion |
Differential Equation: Application of D.E: Mixing and Flow |
Differential Equation: Application of D.E: Exponential Decay |
Differential Equation: $ye^{xy} dx + xe^{xy} dy = 0$ |
Differential Equation: $y' = x^3 - 2xy$, where $y(1)=1$ and $y' = 2(2x-y)$ that passes through (0,1) |
Differential equation: $(x+2y-1)dx-(x+2y-5)dy=0$ |
Differential Equation: $(1-xy)^{-2} dx + \left[ y^2 + x^2 (1-xy)^{-2} \right] dy = 0$ |
Differential equation. how to solve? |
Differential Equation xdy-[y+xy^3(1+lnx)]dx=0 |
Differential Equation $2y \, dx+x(x^2 \ln y -1) \, dy = 0$ |
differential equation |
differential Equation |
Differential Equation |
differential equation |
Differential Equation |
Differential Equation |
Differential Equation |
Differential Equation |
Differential Equation |
Differential equation |
Differential equation |
Differential EQNS: $y \, dx = \left[ x + (y^2 - x^2)^{1/2} \right] dy$ |
Differential Eqn. of family of circles of fixed radius and tangent to the y-axis |