U. X. Xonqulov matematikaning stoxastika
Download 1.93 Mb. Pdf ko'rish
|
49997 (3)
|
11.
12. 13. 1- misol. ( √ ) binom yoyilmaning o„rta hadini toping. Yechish: ( √ ) ( √ ) ( √ ) ( ) yoyilmada 19 ta had bor. O„rta had o„ninchi had bo„lib, ( √ ) ( ) qiymatga teng. 2-misol. (√ √ ) binom yoyilmaning boshidan to„qqizinchi hadini shu yoyilmaning oxiridan to„qqizinchi hadiga nisbati songa teng. no„malumni toping. Yechish: Berilgan ifodani binomi formulasi yordamida yozamiz. (√ √ ) (√ ) (√ ) ( √ ) (√ ) ( √ ) (√ ) ( √ ) ( √ ) yoyilmani boshidan to„qqizinchi hadi (√ ) ( √ ) ifodaga, oxiridan to„qqizinchi hadi esa (√ ) ( √ ) ifodaga teng. tenglik o„rinli bo„lgani uchun, tenglik kelib chiqadi. Shartga ko„ra, 45 ( ) ( ) ( ) ( ) qiymatga teng. U holda bu ifodani soddalashtirib ushbu ( ) ( ) tenglamani yechamiz. ( ) ( ) , , 3-misol. (√ ) binom yoyilmasi beshinchi hadining bi- nomial koeffitsiyentini uch marta orttirilgani, ikki asosga ko„ra logarifmi bilan uchinchi hadi binomial koeffitsiyenti ikki asosga ko„ra logarifmi orasidagi ayirma ga tengligi ma‟lum bo„lsa, o„zgaruv- chining qanday qiymatida uchinchi hadni √ marta orttirilgani bilan to„rtinchi hadi nisbati 1 ga teng bo„ladi. Yechish: Masala shartiga ko„ra, , u holda , ifodani hisoblaymiz, natijada tenglama hosil bo„ladi, uni soddalashtirib, ifodani keltirib chiqaramiz va tenglamani yechamiz, un- dan qiymatlar topiladi. Binom ko„rsatkich bo„lishi mumkin emas. Agar ko„rsatkich bo„lsa, √ (√ ) (√ ) tenglama hosil bo„ladi. Bu tenglamani yechamiz. Ifodaning surati √ (√ ) √ , 46 maxraji esa (√ ) ko„rinishga ega. Ularning nisbatini hisoblaymiz, natijada ushbu √ tenglama hosil bo„ladi. Bu tenglamani yechamiz: ( ) ( ) , Download 1.93 Mb. Do'stlaringiz bilan baham: 
|