Ryabushko A.P. IDZ 5.2 option 13
📂 Mathematics
👤 Timur_ed
Product Description
DHS - 5.2
№1.13. Prove that the function f (x) = sin8x; φ (x) = arcsin5x as x → 0 are the infinitesimal of the same order of smallness.
DHS - 5.2
№1.13. Prove that the function f (x) = sin8x; φ (x) = arcsin5x as x → 0 are the infinitesimal of the same order of smallness.
№2.13 Find limits.
№3.13 investigate these functions continuity and build their schedules.
№4.13 investigate these functions continuity at these points. f (x) = ....; x1 = 3; x2 = 4.№2.13 limits.
№3.13 investigate these functions continuity and build their schedules.
№4.13 investigate these functions continuity at these points. f (x) = ....; x1 = 3; x2 = 4.
№1.13. Prove that the function f (x) = sin8x; φ (x) = arcsin5x as x → 0 are the infinitesimal of the same order of smallness.
DHS - 5.2
№1.13. Prove that the function f (x) = sin8x; φ (x) = arcsin5x as x → 0 are the infinitesimal of the same order of smallness.
№2.13 Find limits.
№3.13 investigate these functions continuity and build their schedules.
№4.13 investigate these functions continuity at these points. f (x) = ....; x1 = 3; x2 = 4.№2.13 limits.
№3.13 investigate these functions continuity and build their schedules.
№4.13 investigate these functions continuity at these points. f (x) = ....; x1 = 3; x2 = 4.
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Ryabushko A.P. IDZ 5.2 option 13
14.12.2021
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