Let n be an odd natural number greater than 1. Then find the number of zeros at the end of the sum `99^(n)+1`

Write the sequence of odd numbers greater than 1.

Add two consecutive natural numbers and find the number, one less than this.

Write the sequence of odd numbers greater than 1.What is the algebraic form of this sequence?

Read the following and answer the questions given below. 1,2,3,4….are natural numbers or counting numbers. The sum of first 4 numbers is 1+2+3+4=(1+4)+(2+3) = 5+5 = 5xx2 =(4+1)+4/2 We can make pairs as given above and can establish a formula to find the sum of first n natural numbers as sum = (1+n)xxn/2 What is the number at the right and of 10^th line 1 2 3 4 5 6 7 8 9 10 .............

Consider two consecutive odd natural numbers both of which are larger than 10, such that their sum is less than 40. If the first odd natural numbers is x, what will be the other odd natural numbers?

Find the mean of first 99 natural numbers.

In which of the following, the number of protons is greater than the number of neutrons, but the number of protons is less than the number of electrons

There are two consecutive odd numbers of which the smaller number is greater than 10 and their sum is less than 40 What are the possible values of x satisfying the inequaities .

Let n be the natural number . Then the range of the function f(n)=^(8-n)P_(n-4),4lenle6 , is