Lets get started on our quarter-long project. First, read this article from the New York Times(Links to an external site.).Now, here is your research city/county/area. Note that these are INDIVIDUAL assignments. However, if you find a useful resource that you think would help your fellow students, by all means, pass along the information. This is not a competition, each persons work is graded on its own merits. So there is no harm in helping each other – that is what researchers do.Now, here is your research city/county/area. Note that these are INDIVIDUAL assignments. However, if you find a useful resource that you think would help your fellow students, by all means, pass along the information. This is not a competition, each persons work is graded on its own merits. So there is no harm in helping each other – that is what researchers do.1. Boston – Madeline2. Denver – Patricia3. Dallas –Emanoil4. Nashville –Alix5. Columbus, Ohio – Michael6. Newark, NJ (do not go into New York) – Samantha H.7. Miami – Daniel8. Austin -Margret9. Los Angeles (CITY, not county) – Preston10. New York – (Queens only) – Luis11. Atlanta – Ana12. Chicago – Zane13. Indianapolis – Jasmine14. Montgomery County, Md. – Giang15. Northern Virginia (this is where Crystal City is located; it is an area, not a real city) – Mazzi16. Philadelphia – Angelique17. Pittsburgh – Iaroslava18. Raleigh, N.C. – Alicia19. Washington, D.C. – Samantha S. (the actual District of Columbia, not the rest of the area around it)20. Detroit – Jaamise21. Tampa – Gio22. Boise – Maxim23. Scottsdale (Arizona) – Qifan24. Salt Lake City – ShariThen, review the instructions for and questions to research for Part 1.Then, submit your research by May 11, 2020 at 11:59 p.m.
Obtain the general solution of the following DEs: i. y′′′ + y′′ − 4y′ + 2y = 0 ii. y(4) + 4y(2) = 0 iii. x(x − 2)y′′ + 2(x − 1)y′ − 2y = 0; use y1 = (1 − x) iv. y′′ − 4y = sin2(x) v. y′′ − 4y′ + 3y = x ; use y1 = e3x vi. y′′ + 5y′ + 6y = e2xcos(x) vii. y′′ + y = sec(x) tan(x)
Obtain the general solution of the following DEs: i. y′′′ + y′′ − 4y′ + 2y = 0 ii. y(4) + 4y(2) = 0 iii. x(x − 2)y′′ + 2(x − 1)y′ − 2y = 0; use y1 = (1 − x) iv. y′′ − 4y = sin2(x) v. y′′