Q: Given two real numbers whose sum is ten What is their maximum product?

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find two positive numbers whose product is a maximum. 1.) the sum is s.

64

two real numbers, whose sum is 8 and product is max, are 4,4. 4+4=8 and 4*4=16.

That's a factor pair.

Numbers whose product is one is called multiplicative inverses.

3 and 7 are prime numbers whose product is 21.

two prime numbers whose product is 141 = 3 & 47

-76 and 76 whose product is -5776.

Any two numbers whose product is '1' are each others' reciprocals.

9

11

19

17 and 3 are two prime numbers whose sum is 20. Their product is 51.

67

802 x 40 = 256000

There are no two primes whose product is 50.There are no two primes whose product is 50.There are no two primes whose product is 50.There are no two primes whose product is 50.

There are no two numbers whose product is 23 and whose sum is 10. 23 is a prime number, and the only numbers whose product is 23 are 23 and 1. A prime number can only be divided by itself and 1.

There are no such numbers.

1x1

333,567,536

Not whole numbers, no.

The numbers are 64 and 65.

The numbers are 18 and 20.

The three numbers are 2, -3, and 6.

19