Find a three digit number if its digits form a geometric progression and the digits of the number which is
smallar by 400 form an A.P. is

The three digit number whose digits are in G.P. and the digits of the number obtained from it by subtracting 400 form an A.P. is equal to.

Find a three – digit number such that its digits are in increasing G.P. (from left to right) and the digits of the number obtained from it by subtracting 100 form an A.P.

The digits of a three digit number N are in A.P. If sum of the digit is 15 and the number obtained by re-versing the digits of the number is 594 less than the original number, then (1000)/(N-252) is equal to

Three digit numbers in which the middle one is a perfect square are formed using the digits 1 to 9 Their sum is

Find a three digit number whose consecutive digits form a G.P. if we subtract 792 from this number, we get a number consisting of the same digits written in the reverse order. Now, it we increase the second digit of the required number by 2, then the resulting digits will form an A.P.

N is a three-digit number. If exceeds the number formed by reversing the digits by 792. Its hundreds digit can be

Find a three digit numberwhose consecutive digits form a GP. If we subtract 792 from this number, we get a number consisting of the same digits written in the reverse order. Now, if we increase the second digit of the required number by 2, then the resulting digits will form an AP.