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What else can I help you with?
What numbers are divisible by 3 and 9?
Oh, dude, numbers divisible by both 3 and 9 are multiples of the least common multiple of 3 and 9, which is 9. So, any number that is a multiple of 9 is also divisible by 3 and 9. Like, it's just basic math, nothing to lose sleep over.
What number does 12 and 14 both go into?
Any number of the form 84*k, where k is an integer, is evenly divisible.
How do you know if a number divisible by 3?
Add together all the digits until you get a single figure answer. If that's divisible by three, so's the original number. E.g. 4,239 broken down to 4 + 2 + 3 + 9 = 18; 1 + 8 = 9, which is a multiple of 3. The original number is therefore divisible by 3
What is the smallest number that is a multiple of 13 and is also divisible by 4 and by 6 with zero remaining?
I BELIEVE IT IS 156 THE SMALLEST NUMBER 4 AND 6 GO INTO IS 12 12 X 13 = 156
If a number is divisible by both 2 and 6 is is always divisible by 12?
Oh, dude, you're hitting me with some math here. So, if a number is divisible by both 2 and 6, it means it's divisible by their common multiple, which is 12. It's like a math party where 12 is the cool kid everyone wants to hang out with. So yeah, if a number can chill with 2 and 6, it's definitely cool enough to roll with 12.
Which expression below is a counterexample to the following statement If a number is divisible by 3 then it is divisible by 6?
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.
What counterexample to the statement all odd numbers are divisible be 3?
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.
What is a counterexample?
a number wich disproves a proposition For example, theprime number 2 is a counterexample to the statement "All prime numbers are odd."
What a counterexample?
a number wich disproves a proposition For example, theprime number 2 is a counterexample to the statement "All prime numbers are odd."
Any number that is divisible by 2 is also divisible by 6 Find a counterexample to show that the conjecture is false?
4 is divisible by 2 but not by 6
Is this biconditional statement true A number is divisible by 6 if and only if it 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
Any number that is divisible by 3 is also divisible by 9 .Find a counterexample to show that the conjecture is false?
You are an Idiot dude. there is no such value
What is a counterexample to the statement all prime numbers are odd?
2 is a prime number.
Any number that is divisible by 4 is also divisible by 8 find a counterexample to show the conjecture is false?
4 divides 4 (once), but 4 is not divisible by 8. ■
What is a counterexample in math?
A counterexample is an example (usually of a number) that disproves a statement. When seeking to prove or disprove something, if a counter example is found then the statement is not true over all cases. Here's a basic and rather trivial example. I could say "There is no number greater than one million". Then you could say, "No! Take 1000001 for example". Because that one number is greater than one million my statement is false, and in that case 1000001 serves as a counterexample. In any situation, an example of why something fails is called a counterexample.
What number is divisible by 6 but not 3?
A number that is divisible by 6 but not by 3 must be a multiple of 6 that is not a multiple of 3. Since 6 is a multiple of 3 (6 = 2 * 3), any multiple of 6 will also be a multiple of 3. Therefore, there is no number that is divisible by 6 but not by 3.
What is the inverse statement of an even number is divisible by two?
If a number is not divisible by two then it is not an even number.
