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6 23 99 1 Find a simple g(n) such that f(n) -e(g(n)), by proving that f(n) - O(g(n)), and that f(n)- S(g(n). Don't use induction / substitution, or calculus, or any fancy formulas ust exaggerate and simpli
6 23 99 1 Find a simple g(n) such that f(n) -e(g(n)), by proving that f(n) - O(g(n)), and that f(n)- S(g(n). Don't use induction / substitution, or calculus, or any fancy formulas ust exaggerate and simpli
How to prove G(n)=n+1 in this algorithm?
1. if (n 0) 2. return 1 3. else if (n1) f 4. return 2 5. else if (n 2) 6. return 3 7. else if (n3) t 8. return 4 else f 9. int OGnew int[n 11 10. G[O]1 12. G[2]3 13. G[3]4 14. int i:-4 15. while (i<n) t 16. if (i mod 20) else ( 20. return G[n]
1. if (n 0) 2. return 1 3. else if (n1) f...
f(t) F(S) (s > 0) S (s > 0) n! t" ( no) (s > 0) 5+1 T(a + 1) 1a (a > -1) (s > 0) $4+1 (s > 0) S-a 1. Let f(t) be a function on [0,-). Find the Laplace transform using the definition of the following functions: a. X(t) = 7t2 b. flt) 13t+18 2. Use the table to thexight to find the Laplace transform of the following function. a. f(t)=t-4e2t b. f(t) = (5 +t)2...
The one-to-one functions g and h are defined as follows. g=((-9, 0), (-3, -6), (0, 3), (5, 7)} h(x)=2x+13 Find the following. $ (0) = 0 olo 1 13 = x 6 ? X h'(x) (5.1)(-4) - 0 The one-to-one functions g and h are defined as follows. g={(-9, 0). (-3, -6), (0, 3), (5, 7)} h(x)=2x+13 Find the following. :"(0) - g OLC x 5 ? (...)(-4) = 0
Question2: 1. f(n)-O(g(n) if there exist c, no>0 such that f(n)for all n 2 no- 2. f(n)-2(g(n)) if there existc, no>0 such that f(n)for all n 2 no- 3. f(n)- (g(n)) if there exist C1, C2,no > 0 such that-for all n 2 no-
Compute / F. ds for the given oriented surface. F (e. z. x), G, s) +(s.rts,n. osrs 1, 0 sss 5, oriented by T, x Ts
Compute / F. ds for the given oriented surface. F (e. z. x), G, s) +(s.rts,n. osrs 1, 0 sss 5, oriented by T, x Ts
Question 2 f'(x) glx) g(x) g'(x) x 5 6 4 z 3 z -4 3 -2 2 4 5 o -5 8 2 A. find h'll), where h(x)=2x-3f(x) 3 0 a B find hils), where h(x) = f(x) g(x) C. find h (3), where h(x) = f(g(x)) D. find n (4), where h(x)= (g(x))*
2. Let g(x) In f(x) where f(x) is a twice differentiable positive function on (0, o) such that f(x + 1) = x f(x) Then for N 1, 2, 3 find g" N+ 2
2. Let g(x) In f(x) where f(x) is a twice differentiable positive function on (0, o) such that f(x + 1) = x f(x) Then for N 1, 2, 3 find g" N+ 2
2 0 f(x) g(3) 9 4 2 2 1 2 6 0 4 3 7 4 1 0 5 6 1 6 7 9 7 3 5 8 5 3 9 8 8 f(g(8)) = g(f(9)) = f(f(2)) = g(9(3)) = Question Help: Video Video Submit Question
0.09/1 points Previous Answers SCalcET8 5.3.002. Let g(x)-f(t) dt, where f is the function whose graph is shown (a) Evaluate g(x) for x 0, 1, 2, 3, 4, 5, and 6 g(0)0 9(2)-8 g(3)-( 20 9(4)- 9(5) 9(6) ) g(6)- (b) Estimate g(7). (Use the midpoint to get the most precise estimate.) 9(7)- (c) Where does g have a maximum and a minimum value? minimum x= maximum x= (d) Sketch a rough graph of g. 7 83 gtx ry again....