Great. A multiple choice question with no choices to look at. Hopefully, one of the expressions said something about the numbers 9 or 15, which are divisible by 3 but not by 6.
5, 7, a bunch of numbers that are odd are not divisible by 3. numbers that are divisible by three can have all their numbers added together and come out with a number that is divisible by 3.
(8/4)/2=1 8/(4/2)=4
102 + 32 = 100 + 9 =109 (not an even number)
Since the statement does not say that they have exactly two lines of symmetry, I do not believe that there is a counter example.
If a number is not divisible by two then it is not an even number.
the number eight
No. Not if it is a true statement. Identities and tautologies cannot have a counterexample.
5, 7, a bunch of numbers that are odd are not divisible by 3. numbers that are divisible by three can have all their numbers added together and come out with a number that is divisible by 3.
How can the following definition be written correctly as a biconditional statement? An odd integer is an integer that is not divisible by two. (A+ answer) An integer is odd if and only if it is not divisible by two
That is false. This type of statement is only true for prime numbers, not for compound numbers such as 6. Counterexample: 2 x 3 = 6
It is one of the statements. Its syntax in BNF is the following: statement ::= for_statement for_statement ::= 'for' '(' opt_expression ';' expression ';' expression ')' statement
Counterexample
The statement is not false. A hexagon is a polygon.
A counterexample is a specific case in which a statement is false.
find a counterexample to the statement all us presidents have served only one term to show statement is false
an example of this is like taking a statement and making it negative, i think.... Such as, "All animals living in the ocean are fish." A counterexample would be a whale(mammal), proving this statement false.
a number wich disproves a proposition For example, theprime number 2 is a counterexample to the statement "All prime numbers are odd."