The digit in the unit's place of `(153)^(98)`is

The digit in the unit's place of (141414)^(12121) is

The sum of the digits in the unit place of all numbers formed with the help of 3,4,5,6 taken all at a time is

Statement-1: the sum of the diigits in the ten's place of all numbers formed with the help of 3,4,5,6 taken all at a time is 108. Statement-2: The sum of the digits in the ten's place= The sum of the digits is the units's place.

On one page of a telephone directory , there were 200 telephone numbers . The frequency distribution of their unit place digit (for example , in the number 25828573 , the unit place digit is 3 ) is given in the following table . {:("Digit",0,1,2,3,4,5,6,7,8,9),("Frequency",22,26,22,22,20,10,14,28,16,20):} Without looking at the pencil is placed on one of these numbers, i.e., the number is chosen at random. What is the probability that the digit in its unit place is 6 ?

The sum of the digits in unit place of all the numbers formed with the help of 3, 4, 5 and 6 taken all a time is

The number of nine nonzero digits such that all the digits in the first four places are less than the digit in the middle and all the digits in the last four places are greater than that in the middle is

The sum of a two digit number and the number obtained by interchanging the digits is 99. If the digit at tens place exceeds the digit at units place by 3, find the number.

Express the following statements as a linear equation in two variables. The sum of a two digit number and the number obtained by reversing the order of its digits is 121. If the digits in unit’s and ten’s place are ‘x’ and ‘y’ respectively.

Write down any three-digit number (for example, 425). Examine why they work ? Make a six-digit number by repeating these digits in the same order (425425). Your new number is divisible by 7, 11, and 13.

The total number of five-digit numbers of different digits in which the digit in the middle is the largest is a. sum_(n=4)^9^n P_4 b. 33(3!) c. 30(3!) d. none of these