No, the product of two positive mixed numbers can never be less than one.
No, the product of two positive mixed numbers can never be less than one.
No. A mixed number must be greater than 1, and two numbers that are greater than one that are multiplied together end up being greater that either number by itself.
No. The product of two negative numbers is positive.
No it’s can not be a number less than one because a number times one get you the same number
never less than n
Products will be greater unless your number set includes a number less than 1.
1001
The two numbers are 10 and 14.
When one of the numbers is positive and the other is negative.
Numbers less than 1 are not normally converted into mixed numbers
Not always. Here are counterexamples: Cases involving 1: 1 x 1 = 1 1 x 3 = 3 Cases involving positive numbers less than 1: 0.5 x 10 = 5 0.5 x 0.5 = 0.25 Note that here we have positive numbers that are less than or equal to 1. When either number is less than 1, the product will not be greater than both numbers. Also, if either number is equal to 1, the product will be equal to the larger of the original numbers. A modified statement is the product P of two positive real numbers x and y such that x, y > 1, is greater than both x and y.
If one of the numbers is negative, but the other is positive, then the product is negative - and therefore smaller than both numbers in the question. For example, 2 x -4 = -8. ===================================== Another contributor added: Also, whenever the absolute magnitude of both factors is less than ' 1 ', the absolute magnitude of the product is less than either factor.