The most reasonable way to solve this is to find the two greatest numbers that will add to 65. This is 32 and 33.
So if we multiply 32 * 33, you will get 1056.
find two positive numbers whose product is a maximum. 1.) the sum is s.
5+5 = 10 (Sum is ten)5*5 = 25 (Product is 25)*this product is maximum for all any 2 real numbers that == 10
two real numbers, whose sum is 8 and product is max, are 4,4. 4+4=8 and 4*4=16.
31
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.
find two positive numbers whose product is a maximum. 1.) the sum is s.
64
5+5 = 10 (Sum is ten)5*5 = 25 (Product is 25)*this product is maximum for all any 2 real numbers that == 10
two real numbers, whose sum is 8 and product is max, are 4,4. 4+4=8 and 4*4=16.
17 and 3 are two prime numbers whose sum is 20. Their product is 51.
19
31
9
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.
3844
asked to work out the product of two or more numbers, then you need to multiply the numbers together. If you are asked to find the sum of two or more numbers, then you need to add the numbers together.
67