How could I mathematically prove these statements? 1.If the difference of two numbers is even then...

How could I mathematically prove these statements? 1. If two relatively prime numbers each divide another,...

How could I mathematically prove these statements? 1. If two relatively prime numbers each divide another, then so does their product. 2. Given a set of numbers, each of them greater then 1, none of them divides one more than their product.

Write the contrapositive statements to each of the following.  Then prove each of them by proving their respective contrapositives. ...

Write the contrapositive statements to each of the following.  Then prove each of them by proving their respective contrapositives.  In both statements assume x and y are integers. a. If  the product xy is even, then at least one of the two must be even. b. If the product xy  is odd, then both x and y must be odd. 3. Write the converse the following statement.  Then prove or disprove that converse depending on whether it is true or not.  Assume x...

True Or False 1. If nn is odd and the square root of nn is a...

True Or False 1. If nn is odd and the square root of nn is a natural number then the square root of nn is odd. 2. The square of any even integer is even 3. The substraction of 2 rational numbers is rational. 4. If nn is an odd integer, then n2+nn2+n is even. 5. If a divides b and a divides c then a divides bc. 6. For all real numbers a and b, if a^3=b^3 then a=b.

1. Prove that the difference of the lengths of two sides of a triangle is less...

1. Prove that the difference of the lengths of two sides of a triangle is less than the third side. 2. Prove that in a triangle one side’s median is less than half the sum of the other two sides. 3. Prove that the sum of the lengths of a quadrilateral’s diagonals is less than its perimeter.

1- Write a program to print only the even numbers from 100 to 200 2- Write...

1- Write a program to print only the even numbers from 100 to 200 2- Write a program to print the odd numbers from 22 – 99 3- Write a program to calculate howe many even number from 10 to 120 1- Write a program to find only the even numbers for 12 different numbers 2- Write a program to find the odd numbers for 10 different numbers 3- Write a program to calculate howe many even number and how...

5 numbers chosen randomly without replacement. (#'s range 1-39). "B" represents number of even numbers, this...

5 numbers chosen randomly without replacement. (#'s range 1-39). "B" represents number of even numbers, this random variable has this probability: x 0 1 2 3 4 5 p(B=x) 0.02693 0.15989 .33858 .31977 .13464 .02020 number of odd #s chosen would then be 5-x, if x is even #s chosen. "C" represents difference b/w # of even and # of odd chosen, --> C= 2B-5 a. show how variance of B is = 1.1177 b. what is SD of "B"?...

Prove that the difference of two numbers not from the same group in the partition is...

Prove that the difference of two numbers not from the same group in the partition is never a multiple of three. The 3 groups are 3k, 3k+1, and 3k+2.

write the following sentences as quantified logical statements, using the universal and existential quantifiers, and defining...

write the following sentences as quantified logical statements, using the universal and existential quantifiers, and defining predicates as needed. Second, write the negations of each of these statements in the same way. Finally, choose one of these statements to prove. If it is true, prove it, and if it is false, prove its negation. Your proof need not use symbols, but can be a simple explanation in plain English. 1. If m and n are positive integers and mn is...

Use the method of direct proof to prove the following statements. 26. Every odd integer is...

Use the method of direct proof to prove the following statements. 26. Every odd integer is a difference of two squares. (Example 7 = 4 2 −3 2 , etc.) 20. If a is an integer and a^ 2 | a, then a ∈ { −1,0,1 } 5. Suppose x, y ∈ Z. If x is even, then x y is even.

Prove the statement in problems 1 and 2 by doing the following (i) in each problem...

Prove the statement in problems 1 and 2 by doing the following (i) in each problem used only the definitions and terms and the assumptions listed on pg 146, not by any previous establish properties of odd and even integers (ii) follow the direction in this section (4.1) for writing proofs of universal statements for all integers n if n is odd then n3 is odd if a is any odd integer and b is any even integer, then 5a+4b...