Determine whether each statement is true or false. For each true statement, give a direct proof as justication. For each false statement, give a counterexample as justification. If x + y is an even integer, then x and y are both even integers. If x^2 = y^2, then x=y.

Carol Gates

Carol Gates

Answered question

2021-08-03

Determine whether each statement is true or false. For each true statement, give a direct evidence as justication. For each false statement, give a counterexample as defense.( separate calculation)
i) If x + y is an even integer, then x and y are both even integers. 
ii) If x2=y2, then x=y. 
iii) The mean1 of two even numbers is even. 
iv) If x and y are even integers, then x + y is an even integer.

Answer & Explanation

Theodore Schwartz

Theodore Schwartz

Skilled2021-08-04Added 99 answers

(i)Given x + y is an even integer
Let us take x = 5 and y = 3 both x + y are add but x + y = 5 + 3 = 8 = 2 - 4
is even.
Hence (i) is false
(ii) It x2=y2
Let us take x = -2 and y = 2
Now x2=(2)2=4
is y2=22=4
x2=y2 but xqy
Hence (ii) is not true
(iii) Let us take x = 6 and y = 4
Now mean of x + y is x+y2
x+y2=6+y2=102=5=2(2)+1
mean of a two even integer is add
(iii) is not true
(iv) Let x and y are even integer
x = 2n xy = 2s, n,s Z
Now x + y = 2n + 2s = 2(n+s) = 2k, k = n + s Z.
Hence x + y is even integers

Vasquez

Vasquez

Expert2023-04-30Added 669 answers

Solution:
i) If x+y is an even integer, then x and y are both even integers.
This statement is false. A counterexample is x=3 and y=2, where x+y=5 is an odd integer.
ii) If x2=y2, then x=y.
This statement is false. A counterexample is x=3 and y=3, where x2=y2=9, but xy.
iii) The mean of two even numbers is even.
This statement is true. Let x and y be two even numbers, then x=2a and y=2b for some integers a and b. The mean of x and y is:
x+y2=2a+2b2=a+b
Since a and b are integers and the sum of two integers is also an integer, the mean of two even numbers is an integer, and therefore even.
iv) If x and y are even integers, then x+y is an even integer.
This statement is true. Let x and y be two even integers, then x=2a and y=2b for some integers a and b. The sum of x and y is:
x+y=2a+2b=2(a+b)
Since a and b are integers and the sum of two integers is also an integer, x+y is an integer, and therefore even.
RizerMix

RizerMix

Expert2023-04-30Added 656 answers

Answer:
i) false
ii) false
iii) false
iv) x + y is even integers
i) If x+y is an even integer, then x and y are both even integers.
This statement is false. We can prove this by finding a counterexample. Let x=1 and y=2. Then x+y=3 is an odd integer, but x and y are not both even.
ii) If x2=y2, then x=y.
This statement is false. We can prove this by finding a counterexample. Let x=2 and y=2. Then x2=y2=4, but xy.
iii) The mean of two even numbers is even.
This statement is true. We can prove this directly. Let x and y be two even numbers. Then there exist integers a and b such that x=2a and y=2b. The mean of x and y is:
x+y2=2a+2b2=a+b
Since a and b are integers, the sum a+b is also an integer. Therefore, the mean of two even numbers is an integer, and thus even.
iv) If x and y are even integers, then x+y is an even integer.
This statement is true. We can prove this directly. Let x and y be two even integers. Then there exist integers a and b such that x=2a and y=2b. The sum of x and y is:
x+y=2a+2b=2(a+b)
Since a and b are integers, the sum a+b is also an integer. Therefore, x+y is a multiple of 2, and thus even.
Jeffrey Jordon

Jeffrey Jordon

Expert2023-04-30Added 2605 answers

i) If x+y is an even integer, then x and y are both even integers.
This statement is false. A counterexample is x=1 and y=2. Then, x+y=3 which is an odd integer, but x and y are not both even.
ii) If x2=y2, then x=y.
This statement is false. A counterexample is x=2 and y=2. Then, x2=y2=4, but x and y are not equal.
iii) The mean of two even numbers is even.
This statement is true. Let x and y be even numbers, then x=2a and y=2b for some integers a and b. Then, the mean of x and y is (x+y)/2=(2a+2b)/2=2(a+b)/2=a+b, which is also an even integer since a and b are integers and the sum of two integers is an integer.
iv) If x and y are even integers, then x+y is an even integer.
This statement is true. Let x and y be even integers, then x=2a and y=2b for some integers a and b. Then, x+y=2a+2b=2(a+b) which is also an even integer since a+b is an integer and the product of an integer and 2 is an even integer.
Therefore, the direct evidence for the true statements is provided and counterexamples are given for the false statements.

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