Find the smallest positive integer x such that: x mod 2=1 x mod 3=2 and x...

What is the smallest positive integer x satisfying x ≡ 1 mod 9, x ≡ 6...

What is the smallest positive integer x satisfying x ≡ 1 mod 9, x ≡ 6 mod 10, x ≡ 4 mod 11?

find an integer x so that x=5 mod 48 and x=3 mod 35

find an integer x so that x=5 mod 48 and x=3 mod 35

find an integer x such that 3x=2 mod 5, and 4x=5 mod 7

find an integer x such that 3x=2 mod 5, and 4x=5 mod 7

Without using induction, prove that for x is an odd, positive integer, 3x ≡−1 (mod 4)....

Without using induction, prove that for x is an odd, positive integer, 3x ≡−1 (mod 4). I'm not sure how to approach the problem. I thought to assume that x=2a+1 and then show that 3^x +1 is divisible by 4 and thus congruent to 3x=-1(mod4) but I'm stuck.

solve the following set of simultaneous congruence x=1 mod (2) x= 2 mod(3) x =3:mod (5)...

solve the following set of simultaneous congruence x=1 mod (2) x= 2 mod(3) x =3:mod (5) x= 4 mod (11)

Solve the system of congruences: x = 1 (mod 3) x = 2 (mod 4) x...

Solve the system of congruences: x = 1 (mod 3) x = 2 (mod 4) x = 2 (mod 5)

1. (a) For each of x = 1, 2, 3, 4, 5, 6 find a ∈...

1. (a) For each of x = 1, 2, 3, 4, 5, 6 find a ∈ {0, 1, ..., 6} where x 2 ≡ a (mod 7). (b) Does x 2 ≡ a (mod 7) have a solution for x every integer a? Justify your answer! (c) For a ∈ {1, ..., 6} (so a not equal to 0!), how many solutions for x are there in the equation x 2 ≡ a (mod 7)? What is the pattern here?

Using Chinese Remainder Theorem solve for X: x = 2 (mod 3) x = 4 (mod...

Using Chinese Remainder Theorem solve for X: x = 2 (mod 3) x = 4 (mod 5) x = 5 (mod 8) I have the answer the professor gave me, but I can`t understand what`s going on. So if you could please go over the answer and explain, it would help a lot. x = 2 (mod 3) x = 3a + 2 3a + 2 = 4 (mod 5) (2) 3a = 2 (2) (mod 5) -----> why number...

Find all integer numbers x solving the congruence 6x + 1 ≡ 4(mod 15).

Find all integer numbers x solving the congruence 6x + 1 ≡ 4(mod 15).

Find the smallest positive integer n for which n2 + n + 17 is composite.

Find the smallest positive integer n for which n2 + n + 17 is composite.