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Ko‘phadni birhadga ko‘paytirish
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- Ko‘phadni birhadga ko‘paytirish
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- Ko‘phadni ko‘phadga ko‘paytirish Ushbu masalani qaraylik. Masala.
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Ko‘phadni birhadga ko‘paytirish
Istalgan ko‘phadni birhadga ko‘paytirish ham xuddi shun- day bajariladi, masalan: ( ) ( ) ( ) ( ) ( ) ( ) ( ) ( ) ( ) ( ) ( ) - - = - + - - = = - + - + - = - - - + + - = - + - 2 2 2 2 3 2 2 3 2 2 2 2 2 2 3 2 3 4 2 4 3 4 8 12 ; 3 4 5 5 3 5 4 5 5 5 15 20 25 . n m nm nm n m nm nm nm n m n m a ab c bc a bc ab bc c bc a bc ab c bc Ko‘phadni birhadga ko‘paytirish uchun ko‘phadning har bir hadini shu birhadga ko‘paytirish va hosil bo‘lgan ko‘payt- malarni qo‘shish kerak. Ko‘phadni birhadga ko‘paytirish natijasida yana ko‘phad hosil bo‘ladi. Hosil bo‘lgan ko‘phadni uning barcha hadlarini standart shaklda yozib, soddalashtirish kerak. Oraliqdagi nati- 16- 12- rasm. b 3a a 2b c O‘lchamlari 12- rasmda ko‘rsatilgan to‘g‘ri burchakli parallelepiðedni qaray- miz. Uning hajmi asosining yuzi bilan balandligining ko‘paytmasiga teng: ( a + 2 b + c )(3 ab ). Bu ifoda a + 2 b + c ko‘phad bilan 3 ab birhadning ko‘paytmasi bo‘ladi. Ko‘paytirishning taqsimot qonunini qo‘llab, bunday yozish mumkin: ( a + 2 b + c )(3 ab ) = a (3 ab ) + 2 b (3 ab ) + + c (3 ab ) = 3 a 2 b + 6 ab 2 + 3 abc . 85 jalarni yozmasdan, birhadlarni og‘zaki ko‘paytirib, birdaniga javobni yozish ham mumkin, masalan, ( ) 2 2 2 2 3 3 1 3 2 2 3 2 4 2 . æ ö - + - - = - + ç ÷ è ø ab ab a b a b a b ab Birhadni ko‘phadga ko‘paytirish ham shunga o‘xshash ba- jariladi, chunki ko‘paytuvchilarning o‘rinlarini almashtirish bilan ko‘paytma o‘zgarmaydi, masalan, 4 pq (3 p 2 - q + 2) = = 12 p 3 q - 4 pq 2 + 8 pq . Ko‘phad va birhad ko‘paytmasini toping (274 — 278): 274. 1) ( ) ( ) - m 5 · 10 + ; 3) ( ) - y 1 7 2 -5 · ; 2) ( ) - - x 1 · 2 2 + ; 4) ( ) ( ) - - m n 2 +3 · 10 ; 275. 1) ( ) ; - a b n 3) ( ) 6 5 2 ; - - x y x 2) ( ) 5 2 ; - x + y z 4 4) ( ) 2 1 . - + x x x 276. 1) ( ) 7 2 3 ; + ab a b 3) ( ) - 2 2 2 12 ; p q q p q 2) ( ) + 2 5 15 3 ; a b b 4) ( ) - 2 3 3 2 . xy xy x 277. 1) ( ) 17 5 6 ; + - a a b ab 3 3) ( ) + + 2 3 5 6 7 ; x y x y z 2) ( ) 2 8 3 ; - + ab b ac c 2 4) ( ) + + 2 2 2 2 3 . xyz x y z 278. 1) - a b ab a b 3 2 4 3 1 3 4 2 4 3 ; 2) + 2 4 3 3 2 1 3 3 2 2 . a b a b ab M a s h q l a r ( ) 2 2 2 2 3 3 1 3 2 2 3 2 4 · 2 . - + - - = - + ab ab a b a b a b ab 86 Ifodani soddalashtiring (279 — 281): 279. 1) ( ) ( ) 2 3 3 2 ; - - - 6 3 t n t n 3) ( ) ( ) 2 3 2 5 2 3 ; - - - - x y y x 2) ( ) ( ) 4 ; - - - 5 2 3 a b a b 4) ( ) ( ) 6 5 7 . - + 7 4 3 p+ p 280. 1) ( ) ( ) - - - 2 2 1 3 2 2 ; x x x x 2) ( ) ( ) - - - 2 2 4 3 2 3 4 3 ; a b b a b b 3) ( ) ( ) ( ) 2 3 4 3 7 7 2 7 ; a + + - - - a a 4) ( ) ( ) ( ) 5 3 6 3 4 . - - - + - 3 2 1 x x x 281. 1) ( ) ( ) ( ) 5 0, 0,7 8 0,7 0,4 ; - - + - 0,8 1 4 1 y y + y 2) - + + 1 1 2 4 2 x x 1 1 2 2 3 1 ; 3) - - - x x 5 1 1 4 1 3 4 5 5 5 4 4 ; 4) ( ) ( ) ( ) 4 1,3 5 0,1 1,62 . + - - + - 0,2 5 6 0,25 y y y 282. Algebraik ifodaning qiymatini toping: 1) ( ) ( ) + - + = = - 7 4 3 6 5 7 , bunda 2, 3; a b a b a b 2) ( ) ( ) + - - - 2 1 2 1 , bunda =10, = 5; a b b a a b 3) ( ) ( ) - + - = = - 2 2 2 2 3 4 4 3 , bunda 10, 5; ab a b ab b a a b 4) ( ) ( ) - - + = - = - 2 2 4 5 3 5 4 , bunda 2, 3. a a b a a b a b Ko‘phadni ko‘phadga ko‘paytirish Ushbu masalani qaraylik. Masala. O‘lchamlari 13- rasmda ko‘rsatilgan shkaflar bi- lan to‘silgan devor sirtining yuzini toping. Shkaflar bilan band bo‘lgan devorning sirti tomonlari 2 a + c + 2 a = 4 a + c va a + b + a = 2 a + b bo‘lgan to‘g‘ri to‘rtburchakdan iborat. Bu to‘g‘ri to‘rtburchak- ning yuzi S = (4 a + c )(2 a + b ) ga teng. (4 a + c )(2 a + b ) ifoda (4 a + c ) va (2 a + b ) ko‘phadlarning ko‘paytmasidir. 17- 87 Sonlarni ko‘paytirishning taqsimot qonunini qo‘llab, S = (4 a + c )(2 a + b ) = 4 a (2 a + b ) + c (2 a + b ) kabi yozish mumkin. So‘ngra, 4 a (2 a + b ) = 8 a 2 + 4 ab va c (2 a + b ) = 2 ac + bc bo‘lgani uchun S = 8 a 2 + 4 ab + 2 ac + bc . 13- rasm. Shunday qilib, mazkur ko‘phadlarning ko‘paytmasini to- pish uchun 4 a + c ko‘phadning har bir hadini 2 a + b ko‘p- hadning har bir hadiga ko‘paytirish va natijalarni qo‘shishga to‘g‘ri keldi. Ixtiyoriy ikkita ko‘phadni ko‘paytirish ham xuddi shunday bajariladi, masalan, ( ) ( ) ( ) ( ) ( ) ( ) - - = × + × - + - × + + - × - = - - + = - + 2 2 2 2 7 2 3 5 (7 ) (3 ) (7 ) 5 2 (3 ) 2 5 21 35 6 10 21 41 10 . n m n m n n n m m n m m n nm mn m n nm m Ko‘phadni ko‘phadga ko‘paytirish uchun birinchi ko‘p- hadning har bir hadini ikkinchi ko‘phadning har bir hadiga ko‘paytirish va hosil bo‘lgan ko‘paytmalarni qo‘shish kerak. Ko‘phadni ko‘phadga ko‘paytirish natijasida yana ko‘phad hosil bo‘- ladi. Hosil qilingan ko‘phadni standart shaklda yozish kerak. 2a c 2a a b a ( ) ( ) - - = - - + 2 2 7 2 3 5 21 35 6 10 . n m n m n nm mn m 88 Masalan, ( )( ) - + - = - - + + + - = - - + - 2 2 2 2 2 4 3 5 10 2 20 4 15 3 10 2 20 19 3 . a b c b c ab ac b bc bc c ab ac b bc c Bir nechta ko‘phadni ko‘paytirishni navbatma-navbat ba- jarish kerak, masalan, ( )( )( ) ( ) ( ) + + - = + + - = = - + - + - = - - 2 2 3 2 2 2 2 3 3 2 3 2 3 3 2 3 3 3 9 2 6 7 6 . a b a b a b a ab b a b a a b a b ab ab b a ab b Ko‘phadlarni ko‘paytiring (283 — 291): 283. 1) ( ) ( ) ; + + a a 2 3 3) ( ) ( ) ; + - m n 6 1 2) ( ) ( ) 1 4 ; - + z z 4) ( ) ( ) 4 5 . + + b c 284. 1) ( ) ( ) 4 3 ; - - c d 3) ( ) ( ) ; x + y x + 1 2) ( ) ( ) 10 2 ; - - - a a 4) ( ) ( ) . - + - - p q q 1 285. 1) ( ) ( ) ; 2 1 4 x + x + 3) ( ) ( ) 3 2 2 1 ; - - m m 2) ( ) ( ) 2 5 ; - a+ a 3 4 4) ( ) ( ) 3 4 . - - 5 p q p q 286. 1) + - a b a b 1 1 2 2 3 3 ; 3) - + 1 1 3 3 a b a b 2 2 ; 2) ( ) ( ) 0,3 0,3 ; - + m m 4) ( ) ( ) . - 0,2 0,5 0,2 0,5 a+ x a x 287. 1) ( ) ( ) ; + + a b a b 2 2 3) ( ) ( ) 2 2 2 2 a b a b + + ; 2) ( ) ( ) 2 2 2 2 5 6 6 5 ; x y x y - - 4) ( ) ( ) 2 2 1 3 . x x x + + + 288. 1) ( ) ( ) 2 2 ; - + + 2 2 4 a b a ab b 2) ( ) ( ) 2 2 9 6 4 ; - + + 2 3 a b a ab b 3) ( ) ( ) ; - 2 2 5 3 25 15 + 9 x + y x xy y 4) ( ) ( ) 2 6 4 . ab b - + 2 3 2 9 a+ b a Yüklə 3,2 Mb. 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