There are two four digit numbers that satisfy condition 1.
1458: sum digits is 18 and 18 ∙ 81 = 1458
1729: sum digits is 19 and 19 ∙ 91 = 1729.

But 1458 does not satisfy condition 2, so we delete it.
1729 does satisfy condition 2: 9271 = 73 ∙ 127 and
(73^2 + 127^2) / 2 = 10729.

Without taking the hint into account, there are two more numbers satifying condition 1:

  1 : sum of digits is 1 and 1 * 1 = 1
81 : sum of digits is 9 and 9 * 9 = 81

Neigther of them satifies the second condition.

between 1000 to 9999 only a single number(1729) satisfies both two properties. here is a 'C' Program to find the number.

#include
#include

main()
{
long x,y,rem,sum,sum1,t,rev,div,flag;

for (x=100;x<=99999;x++)
{
t=x;sum=0;
while(t>0)
{
rem=t%10;
sum=sum+rem;
t=t/10;
}
y=sum;rev=0;
while(sum>0)
{
rev=rev*10+(sum%10);
sum=sum/10;
}
if(x==y*rev)
{
rev=0;sum=x;
while(sum>0)
{
rev=rev*10+(sum%10);
sum=sum/10;
}
div=2;sum1=1;flag=0;
while(rev>1)
{
if(rev%div==0)
{
rev=rev/div;
if(flag==0){
sum1=sum1+(div*div);flag++;}
}
else
{
div=div+1;
flag=0;
}
}
sum1=sum1/2;
printf("x=%d lastno=%d\n",x,sum1);
}
}
getch();

Nice puzzle, and a nice homage to Ramanujan and the taxi number that brought GH Hardy to see him in hospital. Fujiwara (1729) showed 1729 is one of four positive integers (with the others being 81, 1458, and the trivial case 1) which, when its digits are added together, produces a sum which, when multiplied by its reversal, yields the original number.

x = 1729
1+7+2+9 = 19
y=19
19x91= 1729

Royston designed a game 'The Mystery Number' to help his friends in his study group learn Maths. In this game, 6 times of a mystery number is 2601 more than
1
3
of the same mystery number. Find the mystery number.