32. Let {X(t), < t < } be a weakly stationary process having covariance function RX(s) =...
Question:
32. Let {X(t),−∞ < t < ∞} be a weakly stationary process having covariance function RX(s) = Cov[X(t),X(t + s)].
(a) Show that Var(X(t + s) − X(t)) = 2RX(0) − 2RX(t)
(b) If Y(t) = X(t + 1) − X(t) show that {Y(t), −∞ < t < ∞} is also weakly stationary having a covariance function RY(s) = Cov[Y(t),Y(t + s)] that satisfies RY(s) = 2RX(s) − RX(s − 1) − RX(s + 1)
Fantastic news! We've Found the answer you've been seeking!
Step by Step Answer:
Answered By
ANDREW KIPRUTO
Academic Writing Expert
I have over 7 years of research and application experience. I am trained and licensed to provide expertise in IT information, computer sciences related topics and other units like chemistry, Business, law, biology, biochemistry, and genetics. I'm a network and IT admin with +8 years of experience in all kind of environments.
I can help you in the following areas:
Networking
- Ethernet, Wireless Airmax and 802.11, fiber networks on GPON/GEPON and WDM
- Protocols and IP Services: VLANs, LACP, ACLs, VPNs, OSPF, BGP, RADIUS, PPPoE, DNS, Proxies, SNMP
- Vendors: MikroTik, Ubiquiti, Cisco, Juniper, HP, Dell, DrayTek, SMC, Zyxel, Furukawa Electric, and many more
- Monitoring Systems: PRTG, Zabbix, Whatsup Gold, TheDude, RRDtoo
Always available for new projects! Contact me for any inquiries
1+ Reviews
10+ Question Solved
Related Book For 
Question Posted:
