Use an integrating factor to reduce the equations to exact equations and find the general solution.
Use an integrating factor to reduce the equations to exact equations and find the general solution....
Identify the equation as separable, linear, exact, or having an integrating factor that is a function of either x or y alone (3x+3x - 3y)dx + (xy? - x-2)dy = 0 Select all that apply. A. has an integrating factor p(x) or p(y) not equal to a constant OB. linear OC. separable D. exact E. none of the above
number 5 please
1-14 ODES. INTEGRATING FACTORS Test for exactness. If exact, solve. If not, use an integrating factor as given or obtained by inspection or by the theorems in the text. Also, if an initial condition is given, find the corresponding particular solution. 1. 2xy dx + x2 dy = 0 2. xºdx + y°dy = 0 3. sin x cos y dx + cos x sin y dy = 0 4. €3°(dr + 3r de) = 0 5....
on someone Hele Me Sim x nts/504579395186777014 + (graded) Section 2.6: Exact Equations and Integrating Factors < Previous Consider the differential equation: 9 + (4y sec(8y) - 8-tan(87)) y = 2 a. This equation is not exact because M, = does not equal N. b. Find an integrating factor, j, to make the equation exact. Do not include an arbitrary constant in your answer for By assuming that is a function of only (enter x or y), we get that...
14. Find the integrating factor p so that the non-exact differential equation becomes exact (2 Points) (2x + tan y) dx + (x - x2 tan y) dy = 0 O u = csc y O u = - tan y O u = cos y O u = sec y This question is required.
Using the integrating factor method, find the general solution of the differential equation: y + 2 y = 4 x>0. y = x + 2 5 ºr - Syno 04 - 1 - /
Identify the equation as separable, linear, exact, or having an integrating factor that is a function of either x or y alone. (4x+3x - 3y)dx + (xy3 – x-2)dy = 0 Select all that apply. A. exact B. has an integrating factor u(x) or (y) not equal to a constant C. linear D. separable E. none of the above
both please
1. Use the method of separation of variables find the general (explicit) solution to the differential equation = xcscy dy 2. Find the general solution to the first-order linear differential equation dy ex x + 2y = dx X by finding an appropriate integrating factor. (No credit for any other method). Give an explicit solution. 0
Struggling with this
differential equations problem. Can't find the integrating factor
to continue
Solve the equation. (4x2 +2y+ 2y2dx + (x + 2xy)dy 0 An implicit solution in the form F(x,y) C is by multiplying by the integrating factor C, where C is an arbitrary constant, and (Type an expression using x and y as the variables.)
Problem 1. Use an integrating factor to find the unique solution to the following intial value problems: dr. 07. + 3t²x = 4te-+, x(0) = 1. Ex = 2t +5, x(1) = 1.
Find an integrating factor to make the ODE exact: (22 - y - y)d.– (z? - y - x)dy = 0