Which refers to the product of all the positive integers from 1 to n?

Which refers to the product of all the positive integers from 1 to n?

The factorial (denoted or represented as n!) for a positive number or integer (which is denoted by n) is the product of all the positive numbers preceding or equivalent to n (the positive integer).

What is sum of first N positive integers?

Also, the sum of first ‘n’ positive integers can be calculated as, Sum of first n positive integers = n(n + 1)/2, where n is the total number of integers. Let us see the applications of the sum of integers formula along with a few solved examples.

When n is a positive integer?

n is a positive integer. Quantity A: The remainder when n is divided by 5 Quantity B: The remainder when n + 10 is divided by 5 Quantity A is greater., Quantity B is greater., The two quantities are equal., The relationship cannot be determined from the information given.

Is the product of two positive numbers positive?

RULE 2: The product of two positive integers is positive.

What do you call the product of a positive number N and all the positive integers less than it?

factorial
factorial, in mathematics, the product of all positive integers less than or equal to a given positive integer and denoted by that integer and an exclamation point.

What is sum of all positive integers?

The SUM of all positive numbers is infinity.

What do you call the product of a positive integer n and all the positive integers less than N?

factorial, in mathematics, the product of all positive integers less than or equal to a given positive integer and denoted by that integer and an exclamation point.

What is the product of n positive numbers?

>> The product of n positive n… The product of n positive numbers is 1. Their sum is Hence, option D is correct. Was this answer helpful? Show that (x 2y+y 2z+z 2x)(xy 2+yz 2+zx 2)≥9x 2y 2z 2.

What is the sum of all positive numbers that are positive?

But as you mentioned all numbers are positive, all numbers must be 1, leading the sum be n. If the numbers are real or irrational, the sum can be anything larger than or equal to n.

Is it possible to find the sum of two numbers?

Answer is certainly YES. Few such numbers are given below: To find the numbers (in general), let us consider two numbers as x and y. Their sum is x + y and product xy. According to the symmetry, we have The last expression is well-defined only when y −1 ≠ 0 or, y ≠ 1. Here, the numbers may be positive or negative.

What is the sum of s in a function of?

The number of s can be anything. 2. The sum will always be positive, owing to the fact that we are considering the product of only positive numbers. 3. There is no way of being sure about the exact value of the sum as a function of , because the numbers can take absolutely any values.