Give an example of (a) a function f : Z → N that is both one-to-one...

Consider the function f : Z → Z defined by f(x) = x 2 . Is...

Consider the function f : Z → Z defined by f(x) = x 2 . Is this function one-to-one, onto, or neither? Give justification for your claims that rely on definitions. With explanation please

2. Define a function f : Z → Z × Z by f(x) = (x 2...

2. Define a function f : Z → Z × Z by f(x) = (x 2 , −x). (a) Find f(1), f(−7), and f(0). (b) Is f injective (one-to-one)? If so, prove it; if not, disprove with a counterexample. (c) Is f surjective (onto)? If so, prove it; if not, disprove with a counterexample.

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 :...

3 Let A = [0, 1) and B = (0, 1). Give an example to a...

3 Let A = [0, 1) and B = (0, 1). Give an example to a function f : A → B that is a) not one to one and not onto b) onto but not one to one c) one to one but not onto d*) one to one and onto

. Let f : Z → N be function. a. Prove or disprove: f is not...

. Let f : Z → N be function. a. Prove or disprove: f is not strictly increasing. b. Prove or disprove: f is not strictly decreasing.

For each of the following, give an example of a function g and a function f...

For each of the following, give an example of a function g and a function f that satisfy the stated conditions. Or state that such an example cannot exist. Be sure to clearly state the domain and codomain for each function. (a)The function g is a surjection, but the function fog is not a surjection. (b) The function g is not an injection, but the function fog is an injection. (c)The function g is an injection, but the function fog...

Let f: Z -> Z be a function given by f(x) = ⌈x/2⌉ + 5. Prove...

Let f: Z -> Z be a function given by f(x) = ⌈x/2⌉ + 5. Prove that f is surjective (onto).

1. Let a, b ∈ Z. Define f : Z → Z by f(n) = an...

1. Let a, b ∈ Z. Define f : Z → Z by f(n) = an + b. Prove that f is one to one if and only if a does not equal 0.

Give one example of how the structure and function of a cell are related. Give one...

Give one example of how the structure and function of a cell are related. Give one example of how the structure and function of a tissue are related. Give one example that shows how two organs of the muscular system work together. Give one example that shows how two organs of the skeletal system work together. What is the literal meaning of osteoporosis? Which stratum must receive a constant supply of oxygen: basale or corneum? Why?

Which of the following are one-to-one, onto, or both? a. f : Q → Q defined...

Which of the following are one-to-one, onto, or both? a. f : Q → Q defined by f(x) = x3 + x. b. f : S → S defined by f(x) = 5x + 3. c. f : S → S defined by: ?(?) = { ? + 1 ?? ? ≥ 0 ? − 1 ?? ? < 0 ??? ? ≠ −10 ? ?? ? = −10 d. f : N → N × N defined by f(n)...