Code in C++ only You are given an integer A. Let's define an infinite sequence S(A) = A%P, A2%P, A³%P,..., where P = 10° + 7 is a prime and % is the modulo operator. Let's also define a decreasing sum D(S) as the sum of all elements of a sequence S which are strictly smaller than all preceding elements of S. When S is a sequence of non-negative integers, the number of such elements is clearly finite. Find D(S(A). Input • The first line of the input contains a single integer T denoting the number of test cases. The description of T test cases follows. • The first and only line of each test case contains a single integer A. Output For each test case, print a single line containing one integer D(S(A)). Input Output 3 2 100000007 100000006

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Code in C++ only
You are given an integer A. Let's define an infinite sequence
S(A) = A%P, A²%P, A³%P,…, where P = 10° + 7 is a prime and % is
the modulo operator.
Let's also define a decreasing sum D(S) as the sum of all elements of a
sequence S which are strictly smaller than all preceding elements of S. When S is
a sequence of non-negative integers, the number of such elements is clearly finite.
Find D(S(A)).
Input
• The first line of the input contains a single integer T denoting the number of
test cases. The description of T test cases follows.
• The first and only line of each test case contains a single integer A.
Output
For each test case, print a single line containing one integer D(S(A)).
Input
Output
2
3
2
100000007
100000006
Transcribed Image Text:Code in C++ only You are given an integer A. Let's define an infinite sequence S(A) = A%P, A²%P, A³%P,…, where P = 10° + 7 is a prime and % is the modulo operator. Let's also define a decreasing sum D(S) as the sum of all elements of a sequence S which are strictly smaller than all preceding elements of S. When S is a sequence of non-negative integers, the number of such elements is clearly finite. Find D(S(A)). Input • The first line of the input contains a single integer T denoting the number of test cases. The description of T test cases follows. • The first and only line of each test case contains a single integer A. Output For each test case, print a single line containing one integer D(S(A)). Input Output 2 3 2 100000007 100000006
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