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The assertion in the question is simply not true.
Not always.
If ever you have an odd number of negative numbers, the product will always be a negative number. So the answer to this question is negative.
No. Their product is always greater than 0.
3 negative numbers are three negative numbers. There are a lot of things you can do with them: -- You can add them up. Their sum is always a negative number. -- You can add two of them and subtract the third one from the sum. The result could be a positive number or it could be a negative number. It depends on the three negative numbers you started with. -- You can multiply them all together. The product is always a negative number. -- You can multiply all of their absolute values together. The product is always a positive number. -- You can multiply two of them, and divide the product by the third one. The result is always a negative number. -- You can multiply two of them, then raise the product to the power of the third one. The result is always a positive number. -- You can divide one of them by another one, then raise the quotient to the power of the third one. The result is always a positive number. But, as I said at the top, 3 negative numbers are never anything else other than three negative numbers.
Whenever you multiply two negative real numbers.
The assertion in the question is simply not true.
The product of two digit numbers is always greater than either.
The product is not always greater than 1.
No, the product will always be even.
no
Not always.
Yes, the product of three negative numbers is always a negative number.
Not always, but most of the time.
The product will be greater than 1, when each of the two factors are greater than 1.
No. If one of the numbers is 0 it is less; if one of the numbers is 1 it is the same as one of them; otherwise the product is greater than either
When multiplying two negative numbers you multiply as you would with regular positive numbers the product will ALWAYS be positive. Example: -3 x -3 = 9