Differential Equations True or False
For linear second-order homogeneous differential equations with constant coefficients, it is always possible to write the general solution explicitly.
True
Given the n-th order differential equation y(n) + p1(t) y(n1) + ... + pn1(t) y' + pn(t) y = 0, y1(t),...,yn(t) form a fundamental set of solutions of the given ODE on an interval I, if and only if they are linearly independent on I.
True
The linear combination of the solutions y1(t) and y2(t) to y'' +p(t)y' + q(t)y = 0 contains all possible solutions to the problem if and only if the Wronskian, W(y1, y2)(t), is not everywhere zero.
True
The n-th order ODE y(n) + p1(t) y(n1) + ... + pn1(t) y' + pn(t) y = 0, is linear for any p1(t),...,pn(t)
True
A second-order differential equation y'' = f(y', y, t) together with an initial condition y(t0) = y0 forms an Initial Value Problem.
False
The domain of the solution to a first-order differential equation y' = f(y, t) can be identified without solving the problem.
False
The functions f1(t), f2(t),...,fn(t) are said to be linearly independent on an interval I if there exists a set of constants k1, k2,...,kn, not all zero, such that k1f1(t) + k2f2(t) + ··· + knfn(t)=0 for all t in I. The functions f1(t),...,fn(t) are said to be linearly dependent on I if they are not linearly independent there.
False
A first-order differential equation y' = f(y, t) together with an initial condition y(t0) = y0 forms an Initial Value Problem.
True
A function f(x) that has a Taylor series expansion about x = x0 with a radius of convergence ⇢ > 0, is said to be analytic at x = x0.
True
Consider the problem y'' + p(t) y' + q(t) y = g(t). If yp(t) is a particular solution to the problem above and y1(t) and y2(t) are a fundamental set of solutions to the corresponding homogeneous problem, then the general solution to the listed problem is y(t) = y1(t) + y2(t) + yp(t).
True
For linear first-order differential equations it is always possible to write solutions explicitly
True
For the differential equation y'' + p(x) y' + q(x) y = 0: if the functions p(x) and q(x) are analytic at x0, then x0 is said to be an ordinary point of the differential equation; otherwise, it is a singular point.
True
The first-order differential equation y' +p(t) y = g(t) is linear for any p(t) and g(t).
True
The general solution to a linear first-order differential equation contains one arbitrary constant.
True
The second-order ODE y'' + p(t) y' + q(t) y = g(t) is linear for any p(t), q(t), and g(t).
True
