The number N is called “Psycho Number”. Psycho Number is calculated as follows:

First, If we factorize N, then we have some prime and their power. Assume that, there are M powers. From M powers, you should count the number of even and odd powers. Then if the number of even power is strictly greater than odd power, then we call the number N is “Psycho Number”, otherwise the number N is call “Ordinary Number”.

As for example, if N = 67500 then prime factorization,

67500 = 2² x 3³ x 5⁴.

Count even powers and odd powers. This number have 2 even power (2, 4) and 1 odd power (3). Since even power 2 (2, 4) is greater than odd power 1 (3), so the number 67500 is a Psycho Number.

<pnow, you="" have="" to="" find="" the="" psycho="" number="" or="" ordinary="" of="" following="" function:

bool isPsycho( long long K, long long b, long long p)
{
       N = numberoftrailingzeros(K!) * lastdigit(bp);
       if (N == psychonumber)
           return true;
       else
           return false;
}

For example, if k = 10, b = 12, p = 1 then the N is 4 and it's a psycho number.
10! = 3628800, number of trailing zeros is 2.
12¹ = 12, last digit is 2.
so N = 4 then 4 = 2². Even power is greater than odd power, so the number 4 is a Psycho Number.

Input:

An integer T (1<= T <=10⁵) denoting the number of test cases followed by T lines. Each line containing K (1<= K <=4*10⁶), b (0<= b <=10⁴), and p (0<= p <=10¹⁷).

Output:

For each case print “Psycho Number” or “Ordinary Number”.

Sample

Input
2
5 2 5
10 12 1
Output
Ordinary Number
Psycho Number

</p>

Note : 0 and 1 is not a psycho number.
Psycho 1: Psycho
Psycho 3: Make Psycho
Psycho 4: Psycho34 (easy)

Problem setter: Shipu Ahamed, Dept. of CSE, Bangladesh University of Business and Technology (BUBT)

</pnow,>