(a) Give the order of each element of {1,2,3,...,10} modulo 11. (b) Find all possible products...

(a) Give the order of each element of {1,2,3,...,10} modulo 11. (b) Find all possible products...

(a) Give the order of each element of {1,2,3,...,10} modulo 11. (b) Find all possible products of an element of order 2 with an element of order 5 and show that they give primitive elements modulo 11.

(i) Verify that 2 is a primitive root modulo 29. (ii) Find all the primitive roots...

(i) Verify that 2 is a primitive root modulo 29. (ii) Find all the primitive roots modulo 29. Explain how you know you have found them all. (iii) Find all the incongruent solutions to x6 ≡ 5(mod 29).

(a) If a is an integer that is not divisible by 23, what are the possible...

(a) If a is an integer that is not divisible by 23, what are the possible values of ord23(a)? (b) Use part (a) to help show that 5 is a primitive root modulo 23. (c) Show that 2 is NOT a primitive root modulo 23, by using part (b) to help find ord23(2). [Hint: Write 2 as a power of 5 (mod 23).] (d) Use part (b) to help find four more primitive roots modulo 23

Find the order of the given element 11 in U48 Please give me details..

Find the order of the given element 11 in U48 Please give me details..

Let A,BA,B, and CC be sets such that |A|=11|A|=11, |B|=7|B|=7 and |C|=10|C|=10. For each element (x,y)∈A×A(x,y)∈A×A,...

Let A,BA,B, and CC be sets such that |A|=11|A|=11, |B|=7|B|=7 and |C|=10|C|=10. For each element (x,y)∈A×A(x,y)∈A×A, we associate with it a one-to-one function f(x,y):B→Cf(x,y):B→C. Prove that there will be two distinct elements of A×AA×A whose associated functions have the same range.

Compute the order of each element in the Quaternions, Q8. Show all work

Compute the order of each element in the Quaternions, Q8. Show all work

For Boolean variables A, B and C, list all the possible products. (Note that order of...

For Boolean variables A, B and C, list all the possible products. (Note that order of literals doesn’t matter. For example, B A is considered to be the same product as A B, and the same is true for ABC and BCA.)

Find ord5(2), ord7(2), ord11(2), and ord11(3). Where ordn(x) represents the order of x modulo n. Do...

Find ord5(2), ord7(2), ord11(2), and ord11(3). Where ordn(x) represents the order of x modulo n. Do these by hand and show all work.

2. Let a and b be elements of a group, G, whose identity element is denoted...

2. Let a and b be elements of a group, G, whose identity element is denoted by e. Prove that ab and ba have the same order. Show all steps of proof.

6. What is the orbit of 2 in the group Z_7 under multiplication modulo 7? Is...

6. What is the orbit of 2 in the group Z_7 under multiplication modulo 7? Is 2 a generator? 7. What is the residue of 101101 modulo 1101 using these as representations of polynomials with binary coefficients? 8. List all irreducible polynomials with binary coefficients of degree 4 or less. (Hint: produce a times table that shows the minimum number of products needed.) Show these as binary numbers (omitting the indeterminant) and as decimal numbers (interpreting the binary number into...