got part a and b already, can you do part c and d please 1. Find the general solution to each of the following recurr...
got part a and b already, can you do part c and d please 1. Find the general solution to each of the following recurrence relations. (a) an+2-Ta12a2" (b) an27an12 22 (c) ant1-2a, -cosn n+1 +12an COS
could anyone help with these questions? 1. Find the general solution to each of the following recurrence relations (a) an+2 7ant1 +12an 2 (b) an+2 - 7an+1 +12a, -n22 (c) an+12an 2. To calculate the computational complerity_a measure for the maximal possible number of steps needed in a computation of the mergesort' algorithm (an algorithm for sorting natural numbers in non-decreasing order) one can proceed by solving the following recurrence relation: n -2 an-12" -1, with ao0 (a) Use the...
Find the general solutions for these recurrence relations. (c) an+1 2a cosn (c) an+1 2a cosn
question 2 part b please with explanations. thank you! 2. Find a particular solution to each nonhomogeneous recurrence (a) an - 5an-1 – 6an-2 = 2" (for n > 2) (b) an – an-1 – 6an-2 = 5.3" (for n > 2) (C) an - An-1 – 6an-2 = n (for n > 2)
Need answer for all three questions! Thanks (8) Consider the recurrence relation an-3an-4an-2 n (a) Find the general closed-form solution for the homogenous part of a (b) Find the closed-form solution for the non-homogenous part of an (c) Find the closed-form solution for a 13 (d) Find the specific closed-form solution for an if a0 and a (8) Consider the recurrence relation an-3an-4an-2 n (a) Find the general closed-form solution for the homogenous part of a (b) Find the closed-form...
(2) Find the general solution to c = Ax + b for each A and b given bellow (note you are explicitly given the exponential matrix etA for each case) A ( 0 1 . (a) A = 10 cos(t)) tA _/ cos(t) sin(t) | -1 0 1 – sin(t)) l - sin(t) cos(t), ( 1 ) A ( e(V3)+ 0 ) | -3t ) l 0 e-(2/3)t) 5e3t . (c) A= 7 let + le-t je3t – je-t (...
I understand and got part A and B. I am not sure what to do about Part C. A real in-depth answer with the math worked out would be much appreciated! Thanks! 1. Consider matrix equation Ax=b with (2 4 3 -2 A. Convert the augmented matrix to reduced echelon form without using fractions at any intermediate stage. Clearly indicate the operations used in each step. B. Find the set of all solutions, write the solution in the vector form...
#2 part a b and c please. please write solutions neatly 2. (27 points) Find the general solution of the associated homogeneous equation for each nonhomogeneous differential equation below. Then determine the form of a particular solution y, of the nonhomogeneous equation. Do not solve for the undetermined coefficients in y, (a) (10 points) y" - 9 - 22 y 3x2 (b) (10 points) y" - 4y' + 29y = 8r sin 3x 3 2. (c)points) Find a homogeneous linear...
DO BOTH PART A & B. IF YOU CAN"T PLEASE DON"T DO ONLY ONE AND LEAVE IT 22 +1 2z 5-a. Show that the substitution 2-eit) yields cos θ cos θ dθ-0 ( - Don't forget to relate dθ to d.) This method of course works for more inter b. Show using part a. and the residue theorem that esting integrals of complicated functions of cosines and sines.