y''−3y'−10y=−40t+8 y(0)=−4, y'(0)=-13

y''-3y'-10y=-7e^-2x

y''-3y'-10y=-7e^-2x

Which of the following functions are solutions of the differential equation y″−3y′−10y=0 y ″ − 3...

Which of the following functions are solutions of the differential equation y″−3y′−10y=0 y ″ − 3 y ′ − 10 y = 0 ? A. y(x)=exy(x)=ex B. y(x)=e−xy(x)=e−x C. y(x)=−2xy(x)=−2x D. y(x)=e5xy(x)=e5x E. y(x)=e−2xy(x)=e−2x F. y(x)=0y(x)=0 G. y(x)=5xy(x)=5x

Find y as a function of t if y′′+6y′+10y=0 y(0)=7, y′(0)=4 y(t)=

Find y as a function of t if y′′+6y′+10y=0 y(0)=7, y′(0)=4 y(t)=

solve 3y''' +5y'' + 10y' -4y=0 through and auxiliary equation

solve 3y''' +5y'' + 10y' -4y=0 through and auxiliary equation

Solve y''+3y'+2y=Delta(t-1)+t^13*Delta(t-0) y(0)=0,y''(0)=0

Solve y''+3y'+2y=Delta(t-1)+t^13*Delta(t-0) y(0)=0,y''(0)=0

Solve y''+10y'+25y=0,  y(0)=−4,  y'(0)=25 At what time does the function y(t) reach a maximum? t =

Solve y''+10y'+25y=0,  y(0)=−4,  y'(0)=25 At what time does the function y(t) reach a maximum? t =

y"-3y''''+2y= te^2t, y(0)=1, y''(0)=4 solve

y"-3y''''+2y= te^2t, y(0)=1, y''(0)=4 solve

find general solution, primes denote derivatives with respect to x 12 y'' + 7y' - 10y...

find general solution, primes denote derivatives with respect to x 12 y'' + 7y' - 10y = 0 initial value problem y''-4y'+3y=0 y(0)=7, y'(0)=11 the particular solution given equation y''-y'-2y=3x+4

5) 3y'' + 13y' + 10y = sin(x)

5) 3y'' + 13y' + 10y = sin(x)

Find y as a function of x if y‴−10y″+21y′=0 y(0)=3,  y′(0)=1,  y″(0)=7 y(x)=?

Find y as a function of x if y‴−10y″+21y′=0 y(0)=3,  y′(0)=1,  y″(0)=7 y(x)=?