Classify the following equation to be separable, linear, exact, or none of these. It can have...

Insert K = 3 [2x+ycos(kxy)]dx+[xcos(kxy)-2y]dy=0 Describe whether the first order type: Linear or exact and solve...

Insert K = 3 [2x+ycos(kxy)]dx+[xcos(kxy)-2y]dy=0 Describe whether the first order type: Linear or exact and solve to find the general Solution.

Identify the type of ODE below (ex. Separable, Linear, Exact, etc...) and then solve the initial...

Identify the type of ODE below (ex. Separable, Linear, Exact, etc...) and then solve the initial value problem using the appropriate technique (give an explicit final answer in the form "y=...") (x2+1)(dy/dx) + 8xy = -5x, y(0) = 10

1. Check if each of the following ODEs is an exact. If it is not an...

1. Check if each of the following ODEs is an exact. If it is not an exact find an integrating factor to make it an exact. Then solve each of the following ODEs. (a) (2x + 3)dx + (2y−2)dy = 0 (b) (4y + 2x−5) + (6y + 4x−1)y0 = 0

i)Please state if the following equations are exact or not: (a) (sin(xy) − xy cos(xy))dx +...

i)Please state if the following equations are exact or not: (a) (sin(xy) − xy cos(xy))dx + x^2 cos(xy)dy = 0 (b) (x^3 + xy^2 )dx + (x^2 y + y^3 )dy = 0 ii) Determine if the following equation is exact, and if it is exact, find its complete integral in the form g(x, y) = C: (3(x)^2 + 2(y)^2 )dx + (4xy + 6(y)^2 )dy = 0

For each equation below, do the following: - Classify the differential equation by stating its order...

For each equation below, do the following: - Classify the differential equation by stating its order and whether it is linear or non-linear. For linear equations, also state whether they are homogeneous or non-homogeneous. - Find the general solution to the equation. Give explicit solutions only. (So all solutions should be solved for the dependent variable y.) a. y′ = xy2 + xy. b. y′ + y = cos x c. y′′′ = 2ex + 3 cos x d. dy/dx...

solve diffeential equation. ( x2y +xy -y )dx + (x2 y -2 x2) dy =0 answer...

solve diffeential equation. ( x2y +xy -y )dx + (x2 y -2 x2) dy =0 answer x + ln x + x-1 + y- 2 lny = c dy / dx + 2y = e-2x - x^2 y (0) =3 answer y =  3 e -2s + e-2x ( intefral of e -s^2ds ) s is power ^ 2 means s to power of 2  

Consider the following differential equation: dy/dx = −(3xy+y^2)/x^2+xy (a) Rewrite this equation into the form M(x,...

Consider the following differential equation: dy/dx = −(3xy+y^2)/x^2+xy (a) Rewrite this equation into the form M(x, y)dx + N(x, y)dy = 0. Determine if this equation is exact; (b) Multiply x on both sides of the equation, is the new equation exact? (c) Solve the equation based on Part (a) and Part (b).

Consider the second order differential equation d2/dt^2 x + 6 dx/dt + 10x = 0. Classify...

Consider the second order differential equation d2/dt^2 x + 6 dx/dt + 10x = 0. Classify the harmonic oscillator (undamped, underdamped, critically damped, over damped). Justify your answer.

LAB 3.1 Bifurcations in Linear Systems In Chapter 3, we have studied techniques for solving linear...

LAB 3.1 Bifurcations in Linear Systems In Chapter 3, we have studied techniques for solving linear systems. Given the coefficient matrix for the system, we can use these techniquesto classify the system, describe the qualitative behavior of solutions, and give a formula for the general solution. In this lab we consider a two-parameter family of linear systems. The goal is to better understand how different linear systems are related to each other, or in other words, what bifurcations occur in...

The following situation can be modeled by a linear function. Write an equation for the linear...

The following situation can be modeled by a linear function. Write an equation for the linear function and use it to answer the given question. The price of a particular model car is $22,000 today and rises with time at a constant rate of $820 per year. How much will a new car cost in 3.4 years? Use an equation to model this situation where p is the price of a car in dollars and t is the time in...