Mathematics, 14.12.2019 04:31 203888
We will find the solution to the following lhcc recurrence: an=8an−1−16an−2 for n≥2 with initial conditions a0=4,a1=7. the first step as usual is to find the characteristic equation by trying a solution of the "geometric" format an=rnan=rn. (we assume also r≠0). in this case we get: rn=8r^n−1−16r^n−2. since we are assuming r≠0r≠0 we can divide by the smallest power of r, i. e., rn−2 to get the characteristic equation:
r^2=8r−16. (notice since our lhcc recurrence was degree 2, the characteristic equation is degree 2.)
this characteristic equation has a single root rr. (we say the root has multiplicity 2). find r.
r=?
Answers: 1
Mathematics, 21.06.2019 19:30
00 points ! missy’s rotation maps point k(17, –12) to k’(12, 17). which describes the rotation? 270° counterclockwise rotation 90° counterclockwise rotation 90° clockwise rotation 180° rotation
Answers: 1
Mathematics, 22.06.2019 00:30
Julie multiplies 6.27 by 7 and claims the product is 438.9 .explain without multiplying how you know juliesanswer is not correct.find the correct answer
Answers: 1
We will find the solution to the following lhcc recurrence: an=8an−1−16an−2 for n≥2 with initial co...
French, 14.09.2020 22:01
Mathematics, 14.09.2020 22:01
Mathematics, 14.09.2020 22:01
French, 14.09.2020 22:01
History, 14.09.2020 22:01
Biology, 14.09.2020 22:01
Mathematics, 14.09.2020 22:01
History, 14.09.2020 22:01
Mathematics, 14.09.2020 22:01
History, 14.09.2020 22:01
Mathematics, 14.09.2020 22:01
History, 14.09.2020 22:01
English, 14.09.2020 22:01
Mathematics, 14.09.2020 22:01
Social Studies, 14.09.2020 22:01
English, 14.09.2020 22:01
Mathematics, 14.09.2020 22:01
Mathematics, 14.09.2020 22:01
Mathematics, 14.09.2020 22:01
Mathematics, 14.09.2020 22:01