Find the general solution and initial value solution: (cos x)dy = -2y2(tan x)dx, y(0)=1/6

find the explicit particular solution of the initial value problem 2*x^1/2(dy/dx)=(cos^2)*y y(4)=pi/4 differntial equations

find the explicit particular solution of the initial value problem 2*x^1/2(dy/dx)=(cos^2)*y y(4)=pi/4 differntial equations

dy/dx = 2 sqrt(y/x) + y/x (x<0) Find general solution of the given ODE

dy/dx = 2 sqrt(y/x) + y/x (x<0) Find general solution of the given ODE

1.Given that y = x + tan−1 y , find dy dx 2.Determine the equation of...

1.Given that y = x + tan−1 y , find dy dx 2.Determine the equation of the tangent line to the curve y = (2 + x) e −x at the point (0, 2)

find the solution of the first order differential equation (e^x+y + ye^y)dx +(xe^y - 1)dy =0...

find the solution of the first order differential equation (e^x+y + ye^y)dx +(xe^y - 1)dy =0 with initial value y(0)= -1

3. Find the general solution to the differential equation: (x^2 + 1/( x + y) +...

3. Find the general solution to the differential equation: (x^2 + 1/( x + y) + y cos(xy)) dx + (y ^2 + 1 / (x + y) + x cos(xy)) dy = 0

find the particular solution for the following initial value problems A) x dy/dx +2y = x...

find the particular solution for the following initial value problems A) x dy/dx +2y = x to the power of 2 +x , y(1)=1

Consider the initial value problem dy dx = 1−2x 2y , y(0) = − √2 (a)...

Consider the initial value problem dy dx = 1−2x 2y , y(0) = − √2 (a) (6 points) Find the explicit solution to the initial value problem. (b) (3 points) Determine the interval in which the solution is defined.

For 2y' = -tan(t)(y^2-1) find general solution (solve for y(t)) and solve initial value problem y(0)...

For 2y' = -tan(t)(y^2-1) find general solution (solve for y(t)) and solve initial value problem y(0) = -1/3

y = (6 +cos(x))^x Use Logarithmic Differentiation to find dy/dx dy/dx = Type sin(x) for sin(x)sin(x)...

y = (6 +cos(x))^x Use Logarithmic Differentiation to find dy/dx dy/dx = Type sin(x) for sin(x)sin(x) , cos(x) for cos(x)cos(x), and so on. Use x^2 to square x, x^3 to cube x, and so on. Use ( sin(x) )^2 to square sin(x). Use ln( ) for the natural logarithm.

Find dy/dx if y= tan(sinx)

Find dy/dx if y= tan(sinx)