§ 1. Ìíîãî÷ëåíû íàä îáëàñòüþ öåëîñòíîñòè

      ¹ 3. Äîêàæèòå, ÷òî óêàçàííîå ïðîèçâåäåíèå ÿâëÿåòñÿ ìíîãî÷ëåíîì ñ äåéñòâèòåëüíûìè êîýôôèöèåíòàìè:

 

3.01. (õ–(2+3i))×(x–(2–3i));

3.02. (õ –(4 + i)) × (x–(4 – i));

3.03. (õ–(8+3i))×(x–(8–3i));

3.04. (õ –(7 – 5i)) × (x–(7 + 5i));

3.05. (õ–(2–i))×(x–(2+i));

3.06. (õ –(14–3i))×(x–(14+3i));

3.07. (õ–(13–4i))×(x–(13+4i));

3.08. (õ –(6+13i))×(x–(6–13i));

3.09. (õ–(2–17i))×(x–(2+17i));

3.10. (õ –(7 – 2i)) × (x–(7 + 2i));

3.11. (õ–(2–13i))×(x–(2+13i));

3.12. (õ –(13+2i))×(x–(13–2i));

3.13. (õ –(11+3i))×(x–(11–3i));

3.14. (õ –(3+11i))×(x–(3–11i));

3.15. (õ –(7 + 8i)) × (x–(7 – 8i));

3.16. (õ –(1 – 3i)) × (x–(1 + 3i));

3.17. (õ –(2 + 9i)) × (x–(2 – 9i));

3.18. (õ –(12+9i))×(x–(12–9i));

3.19. (z –(11– 8i))×(z–(11+8 i));

3.20. (z –(4 – 8i)) × (z–(4 + 8i));

3.21. (z –(1 + 8i)) × (z–(1 – 8i));

3.22. (z –(3+13i)) × (z–(3–13i));

3.23. (z–(13+1i)) × (z–(13–3i));

3.24. (z–(11+2i)) × (z–(11–2i));

3.25. (z–(17+5i)) × (z–(7–5i));

3.26. (z –(7 – 5i)) × (z–(7 + 5i));

3.27. (z–(8–11i)) × (z–(8+11i));

3.28. (z–(11–8i)) × (z–(11+8i));

3.29. (z –(14+7i)) × (z–(14–7i));

3.30. (z –(4 + 7i)) × (z–(4 – 7i));

3.31. (z –(7 – 4i)) × (z–(7 – 4i));

3.32. (z –(7 – 4i)) × (z–(7 + 4i));

3.33. (z –(4+13i)) × (z–(4–13i));

3.34. (z –(13+4i)) × (z–(13–4i));

3.35.(z–(11–10i))×(z–(11–10i));

3.36. (z–(1–10i))×(z–(1+10i)).

 

\.Ïðèìåð.\

                              Copyright © 2008-2009 Îâ÷èííèêîâ À.Â.  Ôèëèàë ÊÃÏÓ. Âñå ïðàâà çàùèùåíû.