Magic Letters

Alison's magic V was the same as Charlie's, because Alison had just swapped the 5 and the 2, and the 4 and the 3, around so it looked different, but really was exactly the same. The 'arms' still added up to 8.
It was as if you copied someone but just did 4+3+1 and 2+5+1 instead of 3+4+1 and 5+2+1. Exactly the same.

For question 1 there are no other Magic V's containing the numbers 1 to 5 that are different from Charlie's, because you can only mix the top 4 number across and down 4 times, so if you do 4 x 2 sides it equals 8 and the eight Magic V's have already been drawn.

You do the number of odd numbers times 8 if there are more odds than evens and you do the number of evens times 8 if there are more evens than odd, the bottom of the v has to be either odd or even so that the 2 arms of the v contain an odd and an even number and it balances out. If there are 3 odds, 2 evens, bottom of the v is odd so it goes odd even - odd - odd even and the arms can mix around 8 times, it's the other way round for more evens.

You put the lowest number in the box at the bottom then use the highest and second lowest in one side and use the rest of the numbers on the other side

You can easily make a Magic V from 5 consecutive numbers because you just do the following:
Use the 1st, 3rd or 5th number as the bottom point.
For the 4 numbers left over, pair the biggest one with the smallest and pair the two in between.
These pairs would make arms of the same value.
For example:
5 consecutive numbers: 7, 8, 9, 10, 11.
For the sake of argument - the third number (9) is used as the bottom point.
Biggest number (11) paired with smallest number (7). Arm = 11 + 7 = 18.
Two numbers in between (10 & 8) paired. Arm = 10 + 8 = 18.

I found 6 magic vs. 3 of which aren't on your answers. It was easy after I got the hang of it :)

Starting at the end of an arm and listing the numbers in order as I go down and up the other arm:

4, 3, 2, 5, 1
4, 3, 2, 1, 5
3, 4, 2, 5, 1

4, 3, 1, 2, 5
3, 4, 1, 5, 2
2, 5, 1, 3, 4

Say we have five consecutive numbers, a, a + 1, a + 2, a + 3, a + 4.
Now, we have five cases, where each of the five numbers is at the root of the Magic V.

The first case: a is the root of the V. Moving down one arm and up the other arm, we have the following unique Magic V (along with three identical Magic Vs): a + 1, a + 4, a, a + 2, a + 3. These four are the only solutions for the first case.

The second case: a + 1 is the root of the V. Unfortunately, there are no solutions for this case, because out of the remaining numbers, three are even and one is odd, or three are odd and one is even, and thus one of the arms will sum up to be an odd number and the other will sum up to be an even number.

The third case: a + 2 is the root of the V. Moving down one arm and up the other arm, we have the following unique Magic V (along with three identical Magic Vs): a, a + 4, a + 2, a + 1, a + 3. These four are the only solutions for the third case.

The fourth case: a + 3 is the root of the V. Unfortunately, there are no solutions for this case for the same reason as the second case.

The fifth case: a + 4 is the root of the V. Moving down one arm and up the other arm, we have the following unique Magic V (along with three identical Magic Vs): a + 1, a + 2, a + 4, a, a + 3. These four are the only solutions for the fifth case.

In total, there are twelve different possible Magic Vs for any five consecutive numbers, three of which are unique Magic Vs according to Charlie's bizarre redefinition of "same".