(1) | $(4) | 0 (139) | 1 (35) | 2 (42) | 3 (26) | 4 (10) | 5 (6) | 6 (5) | 7 (19) | 8 (6) | 9 (1) | A (270) | B (43) | C (116) | D (224) | E (130) | F (153) | G (26) | H (57) | I (140) | J (6) | K (8) | L (47) | M (77) | N (35) | O (11) | P (537) | Q (18) | R (48) | S (573) | T (206) | U (6) | V (43) | W (85) | X (17) | Y (2) | Z (9) | [ (3) Title Sort descending Last update differential calculus time rates Differential Calculus: center, vertices, foci of the ellipse: 16x² + 25y² - 160x - 200y + 400 = 0 Differential Calculus: Cylinder of largest lateral area inscribed in a sphere Differential Calculus: largest cone inscribed in a sphere Differential Eqn. Elimination of arbitrary constant and finding the general solution Differential Eqn. of family of circles of fixed radius and tangent to the y-axis Differential EQNS:$y \, dx = \left[ x + (y^2 - x^2)^{1/2} \right] dy$Differential Equation Differential Equation Differential Equation Differential Equation Differential equation differential equation Differential Equation differential equation differential Equation Differential equation Differential Equation Differential Equation$2y \, dx+x(x^2 \ln y -1) \, dy = 0$Differential Equation xdy-[y+xy^3(1+lnx)]dx=0 Differential equation. how to solve? Differential Equation:$(1-xy)^{-2} dx + \left[ y^2 + x^2 (1-xy)^{-2} \right] dy = 0$Differential equation:$(x+2y-1)dx-(x+2y-5)dy=0$Differential Equation:$y' = x^3 - 2xy$, where$y(1)=1$and$y' = 2(2x-y)$that passes through (0,1) Differential Equation:$ye^{xy} dx + xe^{xy} dy = 0$Differential Equation: Application of D.E: Exponential Decay Differential Equation: Application of D.E: Mixing and Flow Differential Equation: Application of D.E: Newton's Law of Motion Differential Equation: Application of D.E: Population Growth differential equation: Determine whether a member of the family can be found that satisfies the initial conditions Differential Equation: Eliminate$c_1$and$c_2$from$y = c_1 e^x + c_2 xe^x$Differential Equation: Eliminate$C_1$,$C_2$, and$C_3$from$y=C_1e^x+C_2e^{2x}+C_3e^{3x}$Differential equation: Eliminate the arbitrary constant from$y=c_1e^{5x}+c_2x+c_3$differential equation: given$f(x)$, show that$f(x)$,$f'(x)$, and$f''(x)$are continuous for all$x\$
differential equation: Show that if f and f' are continuous on a ≤ x ≤ b then f and f' are linearly independent on a ≤ x ≤ b