1. Solve for y if dy/dx = (1/a)int[ sqr( 1+ (dt/dx)^2)]dx from 0 to x. 2....

Use the Laplace transform to solve the given system of differential equations. dx/dt=x-2y dy/dt=5x-y x(0) =...

Use the Laplace transform to solve the given system of differential equations. dx/dt=x-2y dy/dt=5x-y x(0) = -1, y(0) = 6

dx/dt - 3(dy/dt) = -x+2 dx/dt + dy/dt = y+t Solve the system by obtaining a...

dx/dt - 3(dy/dt) = -x+2 dx/dt + dy/dt = y+t Solve the system by obtaining a high order linear differential equation for the unknown function of x (t).

Solve the system of differential equations using laplace transformation dy/dt-x=0,dx/dt+y=1,x(0)=-1,y(0)=1

Solve the system of differential equations using laplace transformation dy/dt-x=0,dx/dt+y=1,x(0)=-1,y(0)=1

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

Solve: 1.dy/dx=(e^(y-x)).secy.(1+x^2),y(0)=0.    2.dy/dx=(1-x-y)/(x+y),y(0)=2 .

Solve: 1.dy/dx=(e^(y-x)).secy.(1+x^2),y(0)=0.    2.dy/dx=(1-x-y)/(x+y),y(0)=2 .

a). Find dy/dx for the following integral. y=Integral from 0 to cosine(x) dt/√1+ t^2 , 0<x<pi  ...

a). Find dy/dx for the following integral. y=Integral from 0 to cosine(x) dt/√1+ t^2 , 0<x<pi   b). Find dy/dx for tthe following integral y=Integral from 0 to sine^-1 (x) cosine t dt

Use the Laplace transform to solve the given system of differential equations. 2 dx/dt + dy/dt...

Use the Laplace transform to solve the given system of differential equations. 2 dx/dt + dy/dt − 2x = 1 dx/dt + dy/dt − 6x − 6y = 2 x(0) = 0, y(0) = 0

dy/dt=x , dx/dt=6x-8y, x=1 and y=-1 when t=0

dy/dt=x , dx/dt=6x-8y, x=1 and y=-1 when t=0

Solve a) dx/dt = 3xt^2 b) dx/dt + x^2= x c) y’=x^3(1-y)

Solve a) dx/dt = 3xt^2 b) dx/dt + x^2= x c) y’=x^3(1-y)

dx/dt = 1 - (b+1) x + a x^2 y dy/dt = bx - a x^2...

dx/dt = 1 - (b+1) x + a x^2 y dy/dt = bx - a x^2 y find all the fixed point and classify them with Jacobian.