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55 56. ( ) 2 , 2 , 1 , 2 , 3 74 247 ) = a , munosib kasrlari: ; 74 277 ; 35 131 , 4 15 , 3 11 , 3 4 , 1 3 ( ) , 3 , 2 , 2 , 0 187 77 ) = b munosib kasrlari: ; 12 7 , 5 2 , 2 1 , 1 0 ( ) , 33 , 3 , 3 100 333 ) = c munosib kasrlari: ; 100 333 ; 3 10 ; 1 3 ( ) , 292 , 1 , 15 , 7 , 3 33102 103993 ) = d munosib kasrlari: . 33102 103993 ; 113 355 ; 106 333 ; 7 22 ; 1 3 57 . a ) 37 29 sonni uzluksiz kasrga yoyamiz: ( ) 2 , 1 , 1 , 1 , 3 , 1 , 0 7 29 = . Sxema yor- damida 64 k 0 1 2 3 4 5 6 q k 0 1 3 1 1 1 2 P k 1 0 1 3 4 7 11 29 Q k 0 1 1 4 5 9 14 37 kasrlarni topamiz bilan i ortig Q Q Q Р ' 78 , 0 9 7 ; 01 , 0 008 , 0 126 1 14 9 1 1 9 7 5 4 4 4 ≈ < ≈ = ⋅ = = . Shunday qilib, ( ) . 78 , 0 01 , 0 9 7 37 29 = + ≈ b a Q Р < 4 4 bo’lganligidan xatoni + ishora bi- lan olinadi. 7 ni 9 ga bo’lganda bo’linma ortig’i bilan olinishi sababi 9 7 jami bilan yaqinlashishi bo’lganligidir. O’nli yaqinlashish 78 , 0 37 29 ≈ da xato ko’rsatilmaganligi sababi bu xatoni maxsus hisoblashdadir, ya’ni bu + 0, 008 xato va 7 ni 9 ga bo’lganda yaxlitlash xatolar yig’indisi. ( ) 6830 , 1 0003 , 0 41 69 385 648 ) ≈ + ≈ b ; ( ) . 5909 , 1 0005 , 0 22 35 359 571 ) ≈ − ≈ c 59 . . 11953 893 ) ; 215 159 1 ) ; 225 157 ) ; 552 1421 ) ; 1810 2633 ) ; 43 73 ) ; 19 43 ) g f e d c b a − 60 . a) x = 2; b) x = 2. 61 . a) x = - 125 – 114 t , y = 45 + 41 t ; b) x = 4 + 15 t , y = 5 + 19 t ; c) x = 33 + 17 t , y = 44 + 23 t ; d) x = 88 + 47 t , y = 99 + 53 t ; e) x =- 3 + 18 t , y = 6 + 35 t ; f) x =- 25 + 71 t , y =- 30 + 85 t ; g) x = - 28 + 11 t , y =- 105 + 41 t , t ∈ Z . 5-§ 62 . a ) – 3; b ) 11; c ) 1; d ) 2; e ) 3; f ) 2; g ) – 2; h ) – 2; agar ; 1000 , 1 , 1000 ______ = − > abcd agar va abcd i) 7; j) – 3. 63. Yechish. [ ] [ ] , 1 0 , 1 0 sin, ' ва 2 1 2 1 < ≤ < ≤ + = + = θ θ θ θ yerda bu l bo y y x x u holda [ ] [ ] ( ) [ ] [ ] [ ] ; , 1 0 . 2 1 2 1 y x y x Agar y x y x + = + < + ≤ + + + = + θ θ θ θ agar 65 2 1 2 1 < + ≤ θ θ bo’lsa [ ] [ ] [ ] y x y x + > + bo’ladi. Natijalarni birlashtirsak, [ x + y ] ≥ [ x ] + [ y ] ni hosil qilamiz. 64 . Yechish. [ x ] ni ta’rifiga ko’ra, masala shartiga asosan ax = m + θ , bu yerda 0 ≤ θ < 1 va a ≠ 0, bu tenglikdan a m x θ + = ni hosil qilamiz. 65 . Yechish. 12,4 m = 86 + θ , bu yerda 0 ≤ θ < 1. Tenglikni 5 ga ko’paytiramiz: 62 m = 430 + 5 θ , bundan . 62 5 58 6 62 5 430 θ θ + + = + = m 0 ≤ θ < 1 dan 0 ≤ 5 θ < 5 va m butun musbat son bo’lishi uchun t = + 62 5 58 θ butun bo’lishi lozim. t = 1 deb olsak, 7 ва 5 4 = = m θ ni hosil qilamiz. 66. Yechish. . 4 3 4 ; 4 1 4 3 4 1 4 − = = − = = + = + = p n p p n p n p n p 67. Yechish. , 1 0 , , 0 , 1 < ≤ + = < ≤ + = m r m r q m a ёки m r mq a bu yerdan . m r a m a и m a q − = = 68. . 2 1 2 1 2 1 2 − = = + = + = m k k m k m 69. a) Yechish . 2 ≤ x 2 < 3 yoki 2 3 , 3 2 − ≤ < − < ≤ x bundan x va 3 2 < ≤ x ni olamiz; b) Yechish. x + 1 ning qiymatlari va bundan x ning qiymatlari ham butun bo’lishi zarur. Bu qiymatlarda 3 x 2 – x ham butun bo’ladi va berilgan tenglama 3 x 2 – x = x + 1 teng kuchli bo’ladi, bundan x = 1 ni olamiz. c) Yechish. Berligan tenglamani 0 ≤ x < 4 qiymatlar qanoatlantiradi, bu qiy- matlarda x 4 3 butun qiymatlarni qabul qiladi, ya’ni ; 3 2 2 ; 3 1 1 ; 0 = x . 1 ; 0 ) = x d 70. . 11450 786 10 786 10 6 7 = − 71. Yechish. . 686 7 5 999 7 999 5 999 999 = + − − 72. Yechish. . 33 6 100 3 100 2 100 100 = + − − 66 73. 98. 74 . 488. 75. B (2311; 5, 7, 13, 17) = 1378; 76. B (110; 2,3) = 37. 77 . B (12317; 3,5,7) = 5634. 78 . 393. 79 . 1 1 1 ... ... 1 1 2 − − = + + + = + + + + − − p p p p p p p p p p p p n n n n n n n n 80 . . 29 23 19 17 13 11 7 5 3 2 ! 30 ) ; 23 19 17 13 11 7 5 3 2 ! 25 ) ; 19 17 13 11 7 5 3 2 ! 20 ) ; 13 11 7 5 3 2 ! 15 ) ; 7 5 3 2 ! 10 ) 2 2 4 7 14 26 2 3 6 10 22 2 4 8 18 2 3 6 11 2 4 8 ⋅ ⋅ ⋅ ⋅ ⋅ ⋅ ⋅ ⋅ ⋅ = ⋅ ⋅ ⋅ ⋅ ⋅ ⋅ ⋅ ⋅ = ⋅ ⋅ ⋅ ⋅ ⋅ ⋅ ⋅ = ⋅ ⋅ ⋅ ⋅ ⋅ = ⋅ ⋅ ⋅ = e d c b a 81. . 19 17 13 11 2 ! 10 ! 10 ! 20 2 ⋅ ⋅ ⋅ ⋅ = 82 . Yechish. , 7 ! 100 ! 1000 α = N bu yerda α α + + = + + 49 100 7 100 301 1000 49 1000 7 1000 shartni qanoatlantiradi, bundan α = 148 kelib chiqadi. 83 . Yechish. ( ) ( ) ( ) ( ) . 2 ! ! 1 2 ! ! 2 ! 1 2 ! ! 1 2 m m m m m m + = + = + Agar p > 2 bo’lsa, u holda ∑ ∑ = = + < + ≤ − + k i k i k k i i p m p ерда бу p m p m 1 1 1 1 2 , 1 2 . 84 . Yechish. Ixtiyoriy butun x = k ( a ≤ k ≤ b ) abssissa uchun [ f ( x )]+1 butun or- dinatali va berilgan trapesiyaning ichida va chegarasida joylashadi. Demak, nuqtalar soni ( ) ( ) ∑ + = b a k k f 1 ] [ ga teng. 85. 126. 86. Yechish. Shartga asosan, a = 4 q + 1 yoki a = 4 q + 3 ga teng. Birinchi holda ( ) . 2 1 3 6 3 2 4 3 4 2 4 − = = + + = + + a q q q q a a a Ikkinchi hol ham xuddi shunday tekshiriladi. 87. Yechish. a = mq + r bo’lsin, bu yerda 0 ≤ r < m va ( r , m ) = 1. ( r, m ) = 1 shart barcha m ≤ 2 lar uchun bajarilishidan r = 1 kelib chiqadi. Demak, ( ) ( )( ) ∑ ∑ − − = − ⋅ − = = + − = − = 1 1 1 1 . 2 1 1 2 1 1 1 m i m i m a m m m a i q m q i 67 88. Yechish. [ ] 1 0 , < ≤ + = α α x x bo’lganligidan [ ] [ ] , 2 1 2 2 1 + + = + + α x x x bundan 2 1 1 2 1 2 1 < + ≤ α va + 2 1 α 0 ga yoki 1 ga teng. [ ] α 2 2 2 + = x x va ] 2 [ ] [ 2 ] 2 [ α + = x x bo’lganligidan + + − = + + 2 1 ] 2 [ ] 2 [ 2 1 ] [ α α x x x . Bu yerda [ ] , 0 2 2 1 = = + α α yoki [ ] . 1 2 2 1 = = + α α 89 . Yechish. Tenglamaning har bir qismini y deb belgilab, ( ) ( ) . 1 1 бундан , 1 1 + − < ≤ + < − < ≤ y m x my оламиз ни y m x m x y Bu tengsizlikni qa- noatlantiruvchi x lar mavjud bo’lishi uchun my < ( m -1) ( y + 1) yoki y < m – 1 shartlar bajarilishi zarur va yetarli. Bundan quy- ilagi natija kelib chiqadi: my ≤ x <( m - 1) ( y + 1), bu yerda y – y < m – 1 shartni qanoatlantiruvchi butun son. 90 . Yechish. ax 2 + bx + c funksiya va shu bilan birgalikda [ ax 2 + bx + c ] funksiya a > 0 da quyidan, a < 0 da esa yuqoridan chegaralangan. Ikala holda ham [ ax 2 + bx + c ] funksiya chegarasi . 4 4 2 − − a ac b songa teng. Shu sa- babli a > 0 da berilgan tenglama yechimga ega bo’ladi, agar ; 4 4 2 d a ac b ≤ − − shart bajarilsa va faqat shartda, agar a < 0 bo’lsa, bu shart quyidagicha: . 1 4 4 2 ≥ − − a ac b 91 . . 2 1 ) ; 0 ) ; 3 2 ) ; 6 , 0 ) d c b a Yüklə 0,62 Mb. Dostları ilə paylaş:
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