ab/c
(instead of traditional d/c
).ab/c
:ab/c
(number 1).50 / 3
and you will see 16 2/3
, thus, mod is 2
. Or try 54 / 7
which is 7 5/7
(mod is 5
).If you don't see any fraction then the mod is 0
like 50 / 5 = 10
(mod is 0
).60 / 8
will result in 7 1/2
. Remainder is 1/2
which is 4/8
so mod is 4
.-121 / 26 = -4 17/26
, thus, mod is -17
which is +9
in mod 26. Alternatively you can add the modulo base to the computation for negative numbers: -121 / 26 + 26 = 21 9/26
(mod is 9
).200^5 mod 391
then some tricks from algebra are needed. For example, using rule(A * B) mod C = ((A mod C) * B) mod C
we can write:200^5 mod 391 = (200^3 * 200^2) mod 391 = ((200^3 mod 391) * 200^2) mod 391 = 98
41 mod 12
then find 41 a^b/c 12. You will get 3, 5, 12 and the answer is 5 (the middle one). The mod
is always the middle value.1717 mod 2
:1717 / 2
. The answer is 858.52
) to get 1716
1717
) minus the number you got from the previous step (1716
) -- 1717-1716=1
.1717 mod 2
is 1
.x/y
(your actual numbers here), and press a b/c key, which is 3rd one below Shift key.