Solve the following differential equation. Put your solution in explicit form. y'-y=-t/sqrt(y)

Use variation of parameters to solve the differential equation. Express your answer in the form y=c1y1+c2y2+yp...

Use variation of parameters to solve the differential equation. Express your answer in the form y=c1y1+c2y2+yp 4y''-4y'+y=e^(x/2)(sqrt(1-x^2))

Solve the differential equation: y' = sqrt((y-x)/x) + 1 y(1) = 10

Solve the differential equation: y' = sqrt((y-x)/x) + 1 y(1) = 10

Consider the differential equation y”+5y’+6y=f(t). Write the form of the particular solution if f(t) is the...

Consider the differential equation y”+5y’+6y=f(t). Write the form of the particular solution if f(t) is the following. Do not solve. (a) f(t)= 5t*e^(-2t) (b) f(t)= t^2*sin(2t) (c) f(t)= t + 1 (d) f(t)= 2t^2*e^(-3t) (e) f(t)= 4t^2+3t

Consider the differential equation y”+5y’+6y=f(t). Write the form of the particular solution if f(t) is the...

Consider the differential equation y”+5y’+6y=f(t). Write the form of the particular solution if f(t) is the following. Do not solve. (a) f(t)= 5t*e^(-2t) (b) f(t)= t^2*sin(2t) (c) f(t)= t + 1 (d) f(t)= 2t^2*e^(-3t) (e) f(t)= 4t^2+3t

Put these equations in explicit form: a) y' = -y(y-2) b) y' = sin(t) c) ty'...

Put these equations in explicit form: a) y' = -y(y-2) b) y' = sin(t) c) ty' = ycos(t)

Solve the first-order differential equation by any appropriate method. (Enter your solution in the form F(x,...

Solve the first-order differential equation by any appropriate method. (Enter your solution in the form F(x, y) = C or y = F(x, C) where C is a needed constant.) y dx + (9x + 100y) dy = 0

1. Find the general solution of the first order linear differential equation: 2*x*dy/dx -y-3/sqrt(x)=0. sqrt() =...

1. Find the general solution of the first order linear differential equation: 2*x*dy/dx -y-3/sqrt(x)=0. sqrt() = square root of (). 2. Are there any transient terms in the general solution? Justify your answer.

Solve the Bernoulli differential equation. The Bernoulli equation is a well-known nonlinear equation of the form...

Solve the Bernoulli differential equation. The Bernoulli equation is a well-known nonlinear equation of the form y' + P(x)y = Q(x)yn that can be reduced to a linear form by a substitution. The general solution of a Bernoulli equation is y1 − ne∫(1 − n)P(x) dx = (1 − n)Q(x)e∫(1 − n)P(x) dx dx + C. (Enter your solution in the form F(x, y) = C or y = F(x, C) where C is a needed constant.) y' − 10y...

Use the Laplace Transform method to solve the following differential equation problem: y 00(t) − y(t)...

Use the Laplace Transform method to solve the following differential equation problem: y 00(t) − y(t) = t + sin(t), y(0) = 0, y0 (0) = 1 Please show partial fraction steps to calculate coeffiecients.

Solve the Bernoulli differential equation. The Bernoulli equation is a well-known nonlinear equation of the form...

Solve the Bernoulli differential equation. The Bernoulli equation is a well-known nonlinear equation of the form y' + P(x)y = Q(x)yn that can be reduced to a linear form by a substitution. The general solution of a Bernoulli equation is y1 − ne∫(1 − n)P(x) dx = (1 − n)Q(x)e∫(1 − n)P(x) dx dx + C. (Enter your solution in the form F(x, y) = C or y = F(x, C) where C is a needed constant.) y8y' − 5y9...