(Solved) : 4 True False 1 Correct Answer 1 Incorrect Answer 0 Omitted Answer F N N T N Entails T N 0 Q44085169 . . .
4. True or false? (+1 for each correct answer, -1 for each incorrect answer, 0 for each omitted answer) (a) f(N) = N(t(N)) entails t(N) = 0(f(n)) (b) t(N) = 2(f(n)) entails t(N) = 0 (f(n)) (c) t(N) = o(f(n)) entails t(N) = 0(f(n)) (d) f(N) = o(t(N)) entails t(N) = 0 (f(n)) @) f(N) = O(t(N)) entails t(N) = 0(f(n)) (f) t(N) = o(f(n)) entails t(N) = 0(f(n)) 6. Prove that if I(N) = o(fiN) + g(N)) and g(N) = off (N)) then I(N) = O(fN)). Hint: review how I proved another algebraic big-O property in class (4 points) Show transcribed image text 4. True or false? (+1 for each correct answer, -1 for each incorrect answer, 0 for each omitted answer) (a) f(N) = N(t(N)) entails t(N) = 0(f(n)) (b) t(N) = 2(f(n)) entails t(N) = 0 (f(n)) (c) t(N) = o(f(n)) entails t(N) = 0(f(n)) (d) f(N) = o(t(N)) entails t(N) = 0 (f(n))
@) f(N) = O(t(N)) entails t(N) = 0(f(n)) (f) t(N) = o(f(n)) entails t(N) = 0(f(n))
6. Prove that if I(N) = o(fiN) + g(N)) and g(N) = off (N)) then I(N) = O(fN)). Hint: review how I proved another algebraic big-O property in class (4 points)
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Answer to 4. True or false? (+1 for each correct answer, -1 for each incorrect answer, 0 for each omitted answer) (a) f(N) = N(t(N…
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