Matematika-informatika fakulteti 22. 06-guruh talabasi Mansurova Kamola Xamidullo qizining Algebra fanidan
Kompleks sonlarga oid ayrim tipik misollar
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Kompleks sonlarga oid ayrim tipik misollar
1) x,yR deb faraz qilib, x+8i+(y-3)i=1 tenglamadan x va y larni toping. x+8i+yi-3i=1x+yi=l-5i x=l, y=-5. 2) ni hisoblang. 3) z1 = a1 +b1i, z2=a2+b1i, bo‘lsa bo‘lishini isbotlang. bulardan kelib chiqadi. 4) amallarni bajaring. 5) z2+ =0 tenglamani eching. bo‘lsin, u holda =a-bi bo‘ladi. (a+bi)2+(a-bi)=0 a2+2abi-b2+a-bi=0 (a2+a-b2)+(2ab-b)i=0 b=0 bo‘lganda, a2+a=0(a1=0 a2=-1) bo‘lganda, Demak, z1=0, z2=-1, z3= z4= , lar berilgan tenglamaning ildizlari bo‘ladi. 6) z= hisoblansin. sign (-10)=-l bo‘lgani uchun quyidagiga ega bo‘lamiz: 7) z=1-i sonini trigonometrik shaklda yozing. a=1, b=-1 bo‘lgani uchun 8) Agar bo‘lsa, ni hisoblang. ni hisoblash uchun z1 ni trigonometrik shaklga keltiramiz. (SHu kabi ). chunki, , shu kabi . Demak 9) hisoblansin. a=-2, b=2 bo‘lgani sababli r= , cos = . Bundan 10) 1-C82+ C84- C86+ C88=16 ayniyatni hisoblang. A (l+i)8=l+i C81 - C82 - iC83+ C84+ iC85 - C86 - iC87+ C82+ C88= =(1- iC82 + C84 - C86+ C88)+ i(C81 - C83 +C85 -C87) (*) (1+i)8=1= Kompleks sonlarning tenglik shartini e’tiborga olib, (*) va (**) lardan 1- i C82 + C84 - C86+ C88=16, C81 - C83 +C85+ C87=0 kelib chiqadi. 11) cos3 va sin3 larni cos va sin larning darajalari orqali ifodalang. (cos+sin)3= cos3+isin3 ikkinchi tomondan (cos+sin)3)3= (cos+sin)3= cos3j+3isinjcos2j-3sin2jcosj-isin3j/ Bulardan cos3j=cos3j-3sin2jcosj, sin3j=3sinjcos2j-sin3j. 12) ni hisоblаng. Yechish. Аvvаl ni trigоnоmеtrik shаklgа kеltirib оlаmiz: . Hоsil bo‘lgаn trigоnоmеtrik shаkldаgi kоmplеks sоndаn 3-dаrаjаli ildizlаrni fоrmulа yordаmidа tоpаmiz: Хаr bir ildizni аlоhidа ifоdаlаymiz: 13) (5-3i) + (3+3i)=(5+3) + (3-3)i= 8 (2+5i) + (-2+5i)=(2-2) + (5+5)i= 10i 14) (10+2i) – (3-4i)= (10-3) – (2+4)i= 7+6i (4+5i) – (3+5i)= (4-3) – (5-5)i= 1 15) (5+2i)(3-4i)= 23-14i (2+i)(2-i)= 4+1=5 16) 17)Algebraik ko‘rinishdagi kompleks sonni trigonometrik ko‘rinishga o‘tkazish. α=1+i r=|1+i|= , , , demak, ; α=1+i= 18) 2(Cos200 + iSin200) · 7(Cos1000 + iSin1000)= = 14(Cos1200 + iSin1200)= Yüklə 121,91 Kb. Dostları ilə paylaş:
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