Hi, Consider this. Let us represet a even number by (a)*2 so this is divisble by 2 and hence it is an even number. where a is not 0. say (a)*2 and (b)*2. where a is not 0. (a)*2 * (b)* 2 = (a * b * 2) *2. is again an even number. and hence you will never get an odd number if you multiply two even numbers. if you find any such thing which disproves the above statement. Please let me know kiran.grandhi(at)gmail.com Thanks & Regards, Kiran K Grandhi.
Chat with our AI personalities
Yes - while multiplying odd numbers by even numbers will always produce an even result.
Let E1 and E2 be two even numbers. Then (E1+1)(E2+1) will be the product of two odd numbers. We have E1*E2 +E2+E1+1. Now when we add or multiply even numbers, we get even numbers and we add 1, it's odd.
If you multiply one even number by one odd number, the result is always even. In general, if you multiply several numbers, and at least one of the numbers is even, the product is always even. This is because "even" means "multiple of 2", and if one of the factors contains a 2 as a factor, so will the product.
No, the product will always be even.
37