Y cosx dx + (2Y - sinx)dy=0

Solve the initial value problems. 1) x (dy/dx)+ 2y = −sinx/x , y(π) = 0. 2)...

Solve the initial value problems. 1) x (dy/dx)+ 2y = −sinx/x , y(π) = 0. 2) 3y”−y=0 , y(0)=0,y’(0)=1.Use the power series method for this one . And then solve it using the characteristic method Note that 3y” refers to it being second order differential and y’ first

(x+1)y'=y-1 2) dx+(x/y+(e)?)dy=0 3)ty'+2y=sint 4) y"-4y=-3x²e3x 5) y"-y-2y=1/sinx 6)2x2y"+xy'-2y=0 ea)y=x' b) x=0 2dx/dt-2dy/dt-3x=t; 2

(x+1)y'=y-1 2) dx+(x/y+(e)?)dy=0 3)ty'+2y=sint 4) y"-4y=-3x²e3x 5) y"-y-2y=1/sinx 6)2x2y"+xy'-2y=0 ea)y=x' b) x=0 2dx/dt-2dy/dt-3x=t; 2

Question : y''+6y'+9y=0,y(0)=2,y'(0)=1 , 4y''+12y'+9y=0,y(0)=2,y'(0)=2 y''-y'-2y=cosx , y''+3y'+2y=x^2 - e^2x , y''-3y'+2y=sinx  , y''-2y'-3y=3e^2x

Question : y''+6y'+9y=0,y(0)=2,y'(0)=1 , 4y''+12y'+9y=0,y(0)=2,y'(0)=2 y''-y'-2y=cosx , y''+3y'+2y=x^2 - e^2x , y''-3y'+2y=sinx  , y''-2y'-3y=3e^2x

Find dy/dx if y= tan(sinx)

Find dy/dx if y= tan(sinx)

dx dt = y − 1 dy dt = −3x + 2y x(0) = 0, y(0)...

dx dt = y − 1 dy dt = −3x + 2y x(0) = 0, y(0) = 0

Integration of 2 sinx * cosx. dx

Integration of 2 sinx * cosx. dx

dx/dt=y, dy/dt=2x-2y

dx/dt=y, dy/dt=2x-2y

Find the solution of the following differential equation: (?^3 y/dx^3)-7(d^2 y/dx^2)+10(dy/dx)=e^2x sinx

Find the solution of the following differential equation: (?^3 y/dx^3)-7(d^2 y/dx^2)+10(dy/dx)=e^2x sinx

(1 point) In this problem we consider an equation in differential form Mdx+Ndy=0Mdx+Ndy=0.The equation (4e−2y−(20x4y5e−x+2e−xsin(x)))dx+(−(20x5y4e−x+8e−2y))dy=0(4e−2y−(20x4y5e−x+2e−xsin(x)))dx+(−(20x5y4e−x+8e−2y))dy=0 in...

(1 point) In this problem we consider an equation in differential form Mdx+Ndy=0Mdx+Ndy=0.The equation (4e−2y−(20x4y5e−x+2e−xsin(x)))dx+(−(20x5y4e−x+8e−2y))dy=0(4e−2y−(20x4y5e−x+2e−xsin(x)))dx+(−(20x5y4e−x+8e−2y))dy=0 in differential form M˜dx+N˜dy=0M~dx+N~dy=0 is not exact. Indeed, we have M˜y−N˜x=

Solve the following ODE's/ IVP's y'=1/xsin(y)+2sin(2y) Hint: consider x=x(y) and dx/dy=1/(dx/dy)=1/y'

Solve the following ODE's/ IVP's y'=1/xsin(y)+2sin(2y) Hint: consider x=x(y) and dx/dy=1/(dx/dy)=1/y'