Answer with Step-by-step explanation:
Let Z be a set of integers
We have to prove that [tex]x^2-5x-1[/tex] is odd for all value of x [tex]\in[/tex]Z.
There are two cases
1.When x is an odd integer number
2.when x is even integer number
1.When x is an odd integer number
When x is positive odd integer
Then [tex]x^2[/tex] is positive odd number (because square of odd positive number is always positive an odd number )
5x is also odd number
-5x -1 = -even number
Suppose x=3
Then -15-1=-16
Odd number - even number=Odd number
Hence ,[tex]x^2-5x-1[/tex] is an odd number .
When x is negative odd number
Then x square is positive odd number and 5x is negative odd term term
Therefore,odd number + odd number -1=Even number -1=Odd number
Hence [tex]x^2-5x-1 [/tex] is an odd number.
2.When x is an even number
When x is positive even number
x square is positive even number and 5x is positive even number
Even number -Even number -1 =Even number -odd number =Odd number
Suppose x=4
[tex]x^2-5x-1[/tex]=16-20-1=-5=Odd number
When x is negative even number
Then x square is positive even number and 5x is negative even number
[tex] x^2-5x-1[/tex]=Even number +Even number -1=Even number -1=Odd number
Hence, for all elements of Z[tex]x^2-5x-1[/tex]is odd.
