It is: 32
Multiple
Polynomial
No, the result of a division of one whole number into another might be a whole number, but could also be a fraction.
Numbers whose product is one is called multiplicative inverses.
There can be infinite ways you can do it. One could be: 2.89701928365892894658902395649829012393475602668936689384920938578 94387668937894872904893894278947866890298476....... and so on! The "straight in the middle" one is 2.5 or 2.50 or 2.50000000000000000000000000000000000000000000000000000000000000...
no
a multiplicand
Multiple
If zero is counted as a whole number, then the first three whole numbers are zero, one and two and the product of ANY series containing zero is ZERO. If, on the other hand, only non-zero numbers are considered, then the series is one, two and three and the product is six.
Yes, it certainly could.
For the product to be zero, one of the numbers must be 0. So the question is to find the maximum sum for fifteen consecutive whole numbers, INCLUDING 0. This is clearly achived by the numbers 0 to 14 (inclusive), whose sum is 105.
Polynomial
Integers are whole numbers such as: ..., -3, -2, -1, 0, 1, 2, 3, ... Counting numbers are whole numbers such as: 1, 2, 3, 4, ... So the product can be a whole positive number or zero. Example: (-2)(-3)= 6 (-2)(0) = 0
12 7x5 = 35 7+5 = 12
No, the result of a division of one whole number into another might be a whole number, but could also be a fraction.
10, -9 sum is 1 product is -90. any two numbers one positive one negative, positive has to be larger
1,2,3,4,5,6,7,8,9