Show if y y(x) is a solution to an autonomous differential equation y' - f(y), then so is any "horizontal translation" of y. That is, show for any real number C, the function yc(x) - y(x...
1. (a) If y )Fx), and y satisfies the initial conditions y(O)o and y(O) o, show that [Notice that yc)F) and use (10),) (b) Verify that this expression satisfies the prescribed differential equation and initial conditions. 1. (a) If y )Fx), and y satisfies the initial conditions y(O)o and y(O) o, show that [Notice that yc)F) and use (10),) (b) Verify that this expression satisfies the prescribed differential equation and initial conditions.
Determine if the given function y- f(x) is a solution of the accompanying differential equation Differential equation: 9xy' + 9y-cos x Initial condition: y()0 Solution candidate: y- x O a. No b. Yes Determine if the given function y- f(x) is a solution of the accompanying differential equation Differential equation: 9xy' + 9y-cos x Initial condition: y()0 Solution candidate: y- x O a. No b. Yes
Problem 5. (20 pts) Let f(y) be the real function f: R R depicted in Figurei, and consider the autonomous differential equation y(t) = f(y(t)). fly) у FIGURE 1. The function f(y) for Problem 4. (a) How many constant solutions does the above differential equation have ? (b) Study whether the behaviour of each of the constant solutions of the differential equation y(t) = f(y(t)) is stable, unstable or semistable. (c) Discuss the long-term behaviour of all solutions y(t) to...
consider the differential equation dy/dx = -2x/y. find the particular solution y = f(x) to the guven differential equation witht the intial condition f(1)= -1 umowed for this question. D Consider the differential equatio find the particular solution y = f(x) to the given differential equation with the initial condition f(1) = -1 46) = -1 Hy=f2 xdx 17 2 + C = -x +C (b) (9.6) be the region in the first quadrant bounded by the graph of y...
Below is the graph of the function y(x) which is a solution to the differential equation dy dx = f(x, y). please help me, thanks so much Below is the graph of the function y(I) which is a solution to the differential equation due = f(,y). The 2-values of the labeled points below are -3, -2, and 1.7 respectively. Suppose that for geometric reasons we also know the y-values of points A and B. I wish to use Euler's method...
Say you have an autonomous differential equation x' = f(x) and you have found a critical point x*. Assuming you don't want to make a plot, what quantity can you examine to possibly find out whether x* is a stable or an unstable equilibrium? Select one: o a. del O b. f (x*) O CZU O d. x*(t)
6. [0/2 points) DETAILS PREVIOUS ANSWERS Find the general (real) solution of the differential equation: y"- 2y'- 15y=-51 sin(3 x) -3x | Ae 5x + Be 34 y(x) = 8.5 + -cos(3x) * 17 51 14 sin(3x) - - Find the unique solution that satisfies the initial conditions: Y(0) = 2.5 and y'(o)=37 y(x) = 7. [-12 Points) DETAILS Find the general (real) solution of the differential equation: y" + 4y' + 4y=64 cos(2x) y(x) = Find the unique solution...
4. Let f: X Y +R be any real valued function. Show that max min f(x,y) < min max f(x,y) REX YEY yey reX
Differential equation 1. Chapter 4 covers differential equations of the form an(x)y("4a-,(x)ye-i) + +4(x)y'+4(x)-g(x) Subject to initial conditions y)oyy-Co) Consider the second order differential equation 2x2y" + 5xy, + y-r-x 2- The Existence of a Unique Solution Theorem says there will be a unique solution y(x) to the initial-value problem at x=而over any interval 1 for which the coefficient functions, ai (x) (0 S is n) and g(x) are continuous and a, (x)0. Are there any values of x for...
1 with 5. Consider the differential equation y, f(x,y) with initial condition y(zo) = yo. Show that, zi = zo +h, the solution at x1 can be obtained with an er ror O(h3) by the formula In other words, this formula describes a Runge-Kutta method of order 2. with 5. Consider the differential equation y, f(x,y) with initial condition y(zo) = yo. Show that, zi = zo +h, the solution at x1 can be obtained with an er ror O(h3)...