Shunday qilib oxirgi natija quyidagi ko‘rinishni oladi:
2) f*g kompozitsiyada birinchi bo‘lib f akslantirish, ikkinchi g akslantirish ta‘sir qiladi. Shuning uchun ham g akslantirish aniqlanish sohasini qanday sohaga akslantirishini, ya‘ni g(X) to‘plamni aniq tasavvur qilish lozim. Nafaqat hosil bo‘lgan to‘plam, balki g ning aniqlanish sohasi ham f ning berilishiga qarab qismlarga bo‘linadi.
g ning berilishini modul belgisini olib tashlab yozib olamiz:
agar x (-,-1] bo‘lsa, u holda g akslantirish qoida bo‘yicha ta‘sir qilib, (-,-1] oraliqni (-,-1] oraliqqa akslantiradi. Hosil bo‘lgan to‘plamda esa g akslantirish yuqori qator bilan aniqlanadi. Shunday qilib,
Agar x [-1,+ ) bo‘lsa, u holda g[-1,+ )=[-1, + ) f[-1, )= [-1,1] [1, + ]ushbu to‘plam esa to‘laligicha g ning quyi qator aniqlanishiga tushadi. Demak,
Shunday qilib oxirgi natija quyidagi ko‘rinishni oladi:
![](data:image/png;base64,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)
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