1.53 Theorem. Letab, and be integers with a and not both OY * y yo is...
Theorem 2.1 Consider an IVP of the form y' + g (x)ya h(x), y(%)-yo. Assume that g(x) and h(x) are both continuous on some interval a < x < b and that a < xo < b. Then there exists a unique solution y(x) to the initial value problem that is defined on a <x<b Theorem 2.2 Consider an IVP of the form y' = f (x.y), y(xo) = yo. Assume that ftxy) andfx, y) are both continuous on a...
6.32 Theorem. If k and n are natural numbers with (k, d(n)) =I, then there exist positive integers u and v satisfving ku=(n)u The previous theorem not only asserts that an appropriate exponent is always availahle, but it also tells us how to find it. The numbers u and are solutions lo a lincar Diophantine cquation just like those we studied in Chapter 6.33 Exercisc. Use your observations so far to find solutions to the follow ing congruences. Be sure...
Consider the following nonhomogeneous linear differential equation ay 6) + by(s) + cy!4) + dy'"' + ky'' + my' + ny=3x²3x - 7cos +1 where coefficients a, b, c, d, k, m, n are constant. Assume that the general solution of the associated homogeneous linear differential equation is YAEC,+Ce**+ c xe** + c.xe3* + ecos What is the correct form of the particular solution y of given nonhomogeneous linear differential equation? Yanitiniz: o Yo=Ax*e** + Ex + F **+Cxcos() +oxsin()+Ex+F...
please type your answer or write your answer neatly!
6. Recall that a second order linear differential equation has the form y" + p(x)y' + g(x)y = g(x), and that initial conditions for such an equation take the form y(20) = yo, y'(x0) = yo, where to, yo, and % are real numbers. (a) State carefully the fundamental existence and uniqueness theorem for such differ- ential equations. (Note: There are many equivalent ways to say the same thing. You need...
Solve, finding all solutions. Express the solutions in both radians and degrees. 1 sin x= 2. Express the solutions in radians. Select the correct answer below and, if necessary, fill in the answer box to complete your choice. O A. There is one solution on (0.28) at x = Solutions are of the form x + 2kt, where k is an integer. (Simplify your answer. Type an exact answer, using r as needed. Use integers or fractions for any numbers...
Solve, finding all solutions. Express the solutions in both radians and degrees. cos x= - Express the solutions in radians. Select the correct answer below and, if necessary, fill in the answer box to complete your choice. O A. There is one solution on [0,21) at x = . Solutions are of the form x + 2km, where k is an integer. (Simplify your answer. Type an exact answer, using a as needed. Use integers or fractions for any numbers...
Bayesian statistics question. Please do both parts.
3.6 Exponential family expectations: Let p(yo)-c(d)h(y) exptot(y)} be an a) Take derivatives with respect to ф of both sides of the equation b) Let p(d) x c(d)no enot0ф be the prior distribution for ф. Calculate exponential family model fp(jo) dy l to show that E[t(Y) d--d(φ)/c(d) dp(o)/ do and, using the fundamental theorem of calculus, discuss what must be true so that E-сф)/c(d)-to.
Choose the Kn's that satisfy the
equation.
The Fundamental Theorem of Linear Homogeneous DE's then says that u(x, t) = IK, cos((2n-1) nxje (2n-1) 11Xje -c(2n-1)?n?l1400 ] + (Eq-7) 20 is also a solution of (Eq-1) and (BC's-2). We must now choose the Ki's in (Eq-7) so that (BC-3) is also satisfied. Thus, the Ko's must satisty l(1)] = f(x) = 50 cos(X) 20 u(x,0) = [K, cosí (2n-1) ix ma1
Java
6.11 LAB: Brute force equation solver Numerous engineering and scientific applications require finding solutions to a set of equations. Ex 8x + 7) = 38 and 3x - 5y = -1 have a solution x = 3, y = 2. Given integer coefficients of two linear equations with variables x and y, use brute force to find an integer solution for X and y in the range - 10 to 10 Ex: If the input is 8 7 38...