Work out and prove by induction on n a formula for (fg)^(n), the n-th derivative of...

Use mathematical induction to prove that 3n ≥ n2n for n ≥ 0. (Note: dealing with...

Use mathematical induction to prove that 3n ≥ n2n for n ≥ 0. (Note: dealing with the base case may require some thought. Please explain the inductive step in detail.

Prove by mathematical induction that for all odd n ∈ N we have 8|(n2 − 1)....

Prove by mathematical induction that for all odd n ∈ N we have 8|(n2 − 1). To receive credit for this problem, you must show all of your work with correct notation and language, write complete sentences, explain your reasoning, and do not leave out any details. Further hints: write n=2s+1 and write your problem statement in terms of P(s).

Prove that the number χ(G, n) of valid n-colorings of a multigraphs satisfies the formula χ(G,...

Prove that the number χ(G, n) of valid n-colorings of a multigraphs satisfies the formula χ(G, n) = χ(G − e, n) − χ(G/e, n). Explain the meaning of this formula when there are several edges connecting the endpoints of the edge e.

Prove the following statement by mathematical induction. For every integer n ≥ 0, 2n <(n +...

Prove the following statement by mathematical induction. For every integer n ≥ 0, 2n <(n + 2)! Proof (by mathematical induction): Let P(n) be the inequality 2n < (n + 2)!. We will show that P(n) is true for every integer n ≥ 0. Show that P(0) is true: Before simplifying, the left-hand side of P(0) is _______ and the right-hand side is ______ . The fact that the statement is true can be deduced from that fact that 20...

1. (15 pts total) Prove or disprove each of the following claims, where f(n) and g(n)...

1. (15 pts total) Prove or disprove each of the following claims, where f(n) and g(n) are functions on positive values. (a) f(n) = O(g(n)) implies g(n) = Ω(f(n)) (b) f(n) = O(g(n)) implies 2^f(n) = O(2^g(n)) (c) f(n) = O((f(n))^2)

1. A function f : Z → Z is defined by f(n) = 3n − 9....

1. A function f : Z → Z is defined by f(n) = 3n − 9. (a) Determine f(C), where C is the set of odd integers. (b) Determine f^−1 (D), where D = {6k : k ∈ Z}. 2. Two functions f : Z → Z and g : Z → Z are defined by f(n) = 2n^ 2+1 and g(n) = 1 − 2n. Find a formula for the function f ◦ g. 3. A function f :...

Prove the Fibonacci numbers Fn. (a) If n is a multiple of 5, then Fn is...

Prove the Fibonacci numbers Fn. (a) If n is a multiple of 5, then Fn is divisible by 4. (b) Two Consecutive Fibonacci numbers are not divisible by 7. Please answer correctly and explain each step. Thanks

​​​​​​ Below are ten functions. Find the first derivative of each. All of the derivatives can...

​​​​​​ Below are ten functions. Find the first derivative of each. All of the derivatives can be found by using combinations of the constant rule, power function rule and sum-difference rule.   Do not use the product rule. It is not needed. The degree of difficulty (more or less) increases from (a) to (j). Be sure to show intermediate work. Five points are awarded for correctly developed derivatives. There is no partial credit, because an incorrect derivative is useless. For example,...

Discrete Math In this assignment, A, B and C represent sets, g is a function from...

Discrete Math In this assignment, A, B and C represent sets, g is a function from A to B, and f is a function from B to C, and h stands for f composed with g, which goes from A to C. a). Prove that if the first stage of this pipeline, g, fails to be 1-1, then the entire pipeline, h can also not be 1-1. You can prove this directly or contrapositively. b). Prove that if the second...

Can you show what formula you used and work it out? 1) You have created a...

Can you show what formula you used and work it out? 1) You have created a new short-cut method that you hope will enable students to learn more material in the same amount of time when compared with the usual (old) teaching method. Of course, the method may actually slow down students’ ability to learn. You test this new method by comparing the performances of identical twins using each of these methods. Using a = 0.01,can you conclude that there...