Prove that {??+?:?,?∈?} is dense in ? if and only if  r is an irrational number.

1. Prove that the sum of any rational number with an irrational number must be irrational....

1. Prove that the sum of any rational number with an irrational number must be irrational. 2. Prove or disprove: If a,b, and c are integers such that a|(bc), then a|b or a|c.

10. (a) Prove by contradiction that the sum of an irrational number and a rational number...

10. (a) Prove by contradiction that the sum of an irrational number and a rational number must be irrational. (b) Prove that if x is irrational, then −x is irrational. (c) Disprove: The sum of any two positive irrational numbers is irrational

Prove the statement " For all real numbers r, if r is irrational, then r/2 is...

Prove the statement " For all real numbers r, if r is irrational, then r/2 is irrational ". You may use any method you wish. Be sure to state what method of proof you are using.

Irrational Numbers (a) Prove that for every rational number µ > 0, there exists an irrational...

Irrational Numbers (a) Prove that for every rational number µ > 0, there exists an irrational number λ > 0 satisfying λ < µ. (b) Prove that between every two distinct rational numbers there is at least one irrational number. (Hint: You may find (a) useful)

Prove for distinct primes r, s that (rs)^1/3 is irrational.

Prove for distinct primes r, s that (rs)^1/3 is irrational.

Prove that between any two rational numbers there is an irrational number.

Prove that between any two rational numbers there is an irrational number.

Prove that if p is a positive rational number, then √p + √2 is irrational.

Prove that if p is a positive rational number, then √p + √2 is irrational.

Prove, that between any rational numbers there exists an irrational number.

Prove, that between any rational numbers there exists an irrational number.

Prove by contradiction that 5√ 2 is an irrational number. (Hint: Dividing a rational number by...

Prove by contradiction that 5√ 2 is an irrational number. (Hint: Dividing a rational number by another rational number yields a rational number.)

: Prove by contradiction that 5√ 2 is an irrational number. (Hint: Dividing a rational number...

: Prove by contradiction that 5√ 2 is an irrational number. (Hint: Dividing a rational number by another rational number yields a rational number.)