Prove there are no integer solutions to x^2 + y^2 = 1000003. Should be proven using...

Prove that if x, y are both odd, then x^2 + y^2 is not a perfect...

Prove that if x, y are both odd, then x^2 + y^2 is not a perfect square. (Hint: first prove that if a number is a square and even, it is congruent to zero modulo four.)

1)Let ? be an integer. Prove that ?^2 is even if and only if ? is...

1)Let ? be an integer. Prove that ?^2 is even if and only if ? is even. (hint: to prove that ?⇔? is true, you may instead prove ?: ?⇒? and ?: ? ⇒ ? are true.) 2) Determine the truth value for each of the following statements where x and y are integers. State why it is true or false. ∃x ∀y x+y is odd.

Show 2 different solutions to the task. Prove that for every integer n (...-3, -2, -1,...

Show 2 different solutions to the task. Prove that for every integer n (...-3, -2, -1, 0, 1, 2, 3, 4...), the expression n2 + n will always be even.

Find all integer solutions of 19x+8y=342 with x>0 ,y>0

Find all integer solutions of 19x+8y=342 with x>0 ,y>0

Let R = {(x, y) | x − y is an integer} be a relation on...

Let R = {(x, y) | x − y is an integer} be a relation on the set Q of rational numbers. a) [6 marks] Prove that R is an equivalence relation on Q. b) [2 marks] What is the equivalence class of 0? c) [2 marks] What is the equivalence class of 1/2?

Do each of the following: a) How many integer solutions to x 1 + x 2...

Do each of the following: a) How many integer solutions to x 1 + x 2 + x 3 + x 4 + x 5 + x 6 = 35 are there if all of x 1through x 6are nonnegative? b) How many integer solutions to x 1 + x 2 + x 3 + x 4 + x 5 + x 6 = 35 are there if x 1 ≥ 5, x 2 ≥ 1, x 3 ≥ 2...

(a) Prove or disprove the statement (where n is an integer): If 3n + 2 is...

(a) Prove or disprove the statement (where n is an integer): If 3n + 2 is even, then n is even. (b) Prove or disprove the statement: For irrational numbers x and y, the product xy is irrational.

given x,y are independent random variable. i.e PxY(X,Y)=PX(X).PY(Y). Prove that (1) E(XK.YL)=E(XK).E(YL). Where K,L are integer(1,2,3-----)...

given x,y are independent random variable. i.e PxY(X,Y)=PX(X).PY(Y). Prove that (1) E(XK.YL)=E(XK).E(YL). Where K,L are integer(1,2,3-----) (2) Var(x.y)= var(x).var(y).

3.a) Let n be an integer. Prove that if n is odd, then (n^2) is also...

3.a) Let n be an integer. Prove that if n is odd, then (n^2) is also odd. 3.b) Let x and y be integers. Prove that if x is even and y is divisible by 3, then the product xy is divisible by 6. 3.c) Let a and b be real numbers. Prove that if 0 < b < a, then (a^2) − ab > 0.

Find a fundamental set of solutions of x^2 y"-2 x y' + (x^2 +2) y  = 0...

Find a fundamental set of solutions of x^2 y"-2 x y' + (x^2 +2) y  = 0 , given that y = x sin x satisfies the complementary equation