This version works correctly - the bitmask bm has 1000 1's so Anding with num1 (which has fewer bits) just returns num1

Now we do exactly the same but running "operation"  (line uncommented) before defining num1. The value of num1_And_result is now much longer - the low order bits match those of num1 but there are extra high order bits

But if we define num1 before running operation, it is OK.

It is also OK if we alter the call to operation so the output is different - argument 1001 instead of n = 1000

Set up the finite field.

If we want to represent the elements by integers we need to use the ConvertIn, ConvertOut mechanism. For example

Shorthand way

Longer way

We can find a primitive element at random and check its multiplicative order is 52

To find all the primitive elements - there are 24 of them

showargs: 1. arguments:  y(x) sin(y)

showargs: 2. arguments: y(x), sin(y)

Define group operation and inverse for additive group mod 53.

Use 1 to generate the group

As expected the orders of all elements except the identity are equal to the group order. Therefore they can all generate the group

We can check by seeing if we can generate the same group from one of these elements

Some group tests etc are easier if we have a permutation group. Convert it to a permutation group

Find the elements that have ElementOrder equal to the group order

The identity is not a generator; the other 52 are.

We could check by generating the group with an element and see if we get the same group

EllipticE(phi, k) is given by DLMF 19.2.5 as  = but they point out that A&S used the upper limit in the second integral as z. Maple uses this second convention. Now Mathematica uses this second convention but takes the second argument  to be what Maple calls . So when Maple produces second argument , that is equivalent to MMA's second argument  So for the integral in question we expect EllipticE(sin(x),I)

which suggests we need some appropriate assumptions to get the simpler result. The following works