What is the difference of two numbers?
The difference of two numbers is 1365. On dividing the larger number by the smaller, we get 6 as quotient and the 15 as remainder. What is the smaller number? E.
What will be the remainder if 234 is divided by 13?
On Dividing A Certain Number By 234, We Get 43 As Remainder. If The Same Number Is Divided By 13, What Will Be The Remainder? then, number= 234*x+43—–> (1).
Is 7N2 + 7N always divisible by 7?
If N Is A Natural Number, Then (7 (n2) + 7n) Is Always Divisible By: (7n2 + 7n) = 7n (n + 1), which is always divisible by 7 and 14 both, since n (n + 1) is always even. Question 25. 96 X 96 + 84 X 84 =?
What is the remainder of (55^55+1) divided by (x+1)?
(x^n+1) is divisible by (x+1), when n is odd. .’. (55^55+1) is divisible by (55+1)=56. when (55^55+1)+54 is divided by 56, the remainder is 54. Question 14. Two Third Of Three Fourth Of A Number Is 24. Then One Third Of That Number Is? Question 15. The Sum Of Digits Of A Two Digit Number Is 13,the Difference Between The Digits Is 5.
To find the difference between two numbers, subtract the number with the smallest value from the number with the largest value. The product of this sum is the difference between the two numbers. Therefore the difference between 45 and 100 is 55.
How to find the sum of squares of first 40 natural numbers?
Q.2: Find the addition of squares of the first 40 natural numbers. Solution: The formula of the sum of squared natural numbers is given by: Σn 2 = [n (n+1) (2n+1)]/6. Here, n = 40.
What is the formula for the addition of squares of natural numbers?
In short, it is denoted by the notation Σn 2. The formula for the addition of squares of natural numbers is given below: The addition of squares of first even natural numbers is given by: Σ (2n) 2 = 4 [ [n (n+1) (2n+1)]/6] (Formula for sum of squared n natural numbers)
What is the sum of squares of variation between individual values?
In statistics, it is equal to the sum of the squares of variation between individual values and the mean, i.e., Σ (xi + x̄)2 Where x i represents individual values and x̄ is the mean. Sum of Squares Formulas and Proofs
What does sum of squares mean in math?
Sum of Squares. Sum of squares refers to the sum of the squares of numbers. It is basically the addition of squared numbers. The squared terms could be 2 terms, 3 terms, or ‘n’ number of terms, first n even terms or odd terms, set of natural numbers or consecutive numbers, etc.