Win money with magic squares

Here is an "almost" magic square.
All rows and columns, and one diagonal sum to 21609. Sadly the diagonal from top left to bottom right sums to 14358

94^2, 2^2, 113^2
97^2, 74^2, 82^2
58^2, 127^2, 46^2

I looked into that topic a bit and came to the conclusion that the smallest possible one with six squares is.

17^2; 35^2; 19^2
697 ; 25^2; 553
889 ; 5^2 ; 31^2

Maybe that is already known

I think I may have solved this but I am afraid the solution I came up with is a few typed pages long. Is there an email or something I can send the proof to? Be warned its a little rough but all of the necessary ideas are there and if it isn't I'd gladly reply to questions.

To demonstrate that it is not possible to construct a combination of 16 numbers that add up to exactly 256 in each row, column, and diagonal, we can use the parity method.

If we add up the numbers in a magic square of odd size (e.g. 3x3, 5x5, 7x7), the resulting sum is always an odd number. This is because each number on the main diagonal is counted twice, while each number on a secondary diagonal is counted only once. As there is an odd number of diagonals, the total sum will be odd.

On the other hand, if we add up the numbers in a magic square of even size (e.g. 4x4, 6x6, 8x8), the resulting sum is always an even number. This is because each number on a diagonal is counted only once, and there is an even number of diagonals. Therefore, the total sum will be even.

In the case of a 4x4 magic square, the sum of the numbers must be equal to 256. Since 256 is an even number, each row, column, and diagonal must add up to an even number. Therefore, if we add up the numbers on a main diagonal (which contains 4 numbers), we will get an even sum, as each number is counted twice. Similarly, if we add up the numbers on a secondary diagonal (which contains 4 numbers), we will get an even sum, as each number is counted only once. Therefore, the sum of the two diagonals will be even.

However, since the diagonals already add up to an even number, it is not possible for the rows and columns to also add up to an even number, unless some numbers are counted more than once. But since each number appears only once in a magic square, it is not possible to have an even sum in all the rows, columns, and diagonals. Therefore, it is not possible to construct a 4x4 magic square with a sum of 256 in each row, column, and diagonal.

To demonstrate this, we can use the following notation:

A1, A2, A3, A4 are the numbers in the first row;
B1, B2, B3, B4 are the numbers in the second row;
C1, C2, C3, C4 are the numbers in the third row;
D1, D2, D3, D4 are the numbers in the fourth row.
The sum of the numbers in each row, column, and diagonal can be represented as follows:

S1 = A1 + A2 + A3 + A4
S2 = B1 + B2 + B3 + B4
S3 = C1 + C2 + C3 + C4
S4 = D1 + D2 + D3 + D4
S5 = A1 + B1 + C1 + D1
S6 = A2 + B2 + C2 + D2
S7 = A3 + B3 + C3 + D3
S8 = A4 + B4 + C4 + D4
S9 = A1 + B2 + C3 + D4
S10 = A4 + B3 + C2 + D1
In order for it to be possible to construct a combination of 16 numbers that add up to exactly 256 in each row, column, and diagonal, all values of S1 to S10 must be equal to 256.

We can use the following equation to calculate the value of each sum:

Si = ai1 + ai2 + ai3 + ai4, where i is the number of the sum and ai1, ai2, ai3, ai4 are the four numbers that make up the sum.
We can rearrange the equation as follows:

ai1 = Si - ai2 - ai3 - ai4
We can use this equation to calculate the value of each number based on the values of the other three. For example, we can calculate the value of A1 as follows:

A1 = S1 - A2 - A3 - A4
We can use this same equation to calculate the value of all the other numbers.

However, if we try to apply this equation to all the sums, we will see that there is a conflict. For example, if we try to calculate the value of A1 using the sums S1, S5, and S9, we will get three different equations:

A1 = S1 - A2 - A3 - A4
A1 = S5 - B1 - C1 - D1
A1 = S9 - B2 - C3 - D4
These equations cannot all be true, because each number must appear only once in the combination of 16 numbers. Therefore, it is not possible to construct a combination of 16 numbers that add up to exactly 256 in each row, column, and diagonal.

It is not possible to construct a magic square that is both additive and multiplicative, even if the sum and the product are different. To understand why this is true, we can use the distributive property of multiplication over addition.

Suppose we have a 5x5 magic square that is both additive and multiplicative, with a magic sum S and a magic product P. We can then write the following equations:

x₁ + x₂ + x₃ + x₄ + x₅ = S
x₆ + x₇ + x₈ + x₉ + x₁₀ = S
x₁₁ + x₁₂ + x₁₃ + x₁₄ + x₁₅ = S
x₁₆ + x₁₇ + x₁₈ + x₁₉ + x₂₀ = S
x₂₁ + x₂₂ + x₂₃ + x₂₄ + x₂₅ = S

x₁ * x₂ * x₃ * x₄ * x₅ = P
x₆ * x₇ * x₈ * x₉ * x₁₀ = P
x₁₁ * x₁₂ * x₁₃ * x₁₄ * x₁₅ = P
x₁₆ * x₁₇ * x₁₈ * x₁₉ * x₂₀ = P
x₂₁ * x₂₂ * x₂₃ * x₂₄ * x₂₅ = P

Now, if we multiply all the equations in the first list, we get:

(x₁ + x₂ + x₃ + x₄ + x₅) * (x₆ + x₇ + x₈ + x₉ + x₁₀) * (x₁₁ + x₁₂ + x₁₃ + x₁₄ + x₁₅) * (x₁₆ + x₁₇ + x₁₈ + x₁₉ + x₂₀) * (x₂₁ + x₂₂ + x₂₃ + x₂₄ + x₂₅) = S⁵

And if we multiply all the equations in the second list, we get:

(x₁ * x₂ * x₃ * x₄ * x₅) * (x₆ * x₇ * x₈ * x₉ * x₁₀) * (x₁₁ * x₁₂ * x₁₃ * x₁₄ * x₁₅) * (x₁₆ * x₁₇ * x₁₈ * x₁₉ * x₂₀) * (x₂₁ * x₂₂ * x₂₃ * x₂₄ * x₂₅) = P⁵

However, since the magic square is both additive and multiplicative, we can equate the two expressions above:

S⁵ = P⁵

But this contradicts Fermat's Last Theorem, which states that there are no integer solutions to the equation xⁿ + yⁿ = zⁿ when n is greater than 2. Therefore, it is not possible to construct a magic square that is both additive and multiplicative, even if the sum and the product are different.

It is not possible to construct a magic square of cubes of order 6. Using modular arithmetic, we can show that it is impossible to obtain a sum of cubes that is a multiple of 6 or congruent to a multiple of 6 modulo 6.

If we cube both sides of the equation 6S ≡ 0 (mod 6), we get:

216S³ ≡ 0 (mod 6)

Simplifying, we get:

S³ ≡ 0 (mod 6)

Now, we can consider all possibilities for each value of the sum S:

• If S is a multiple of 6, then S³ is a multiple of 216, which means it is impossible to obtain a sum of cubes that is a multiple of 6.
• If S is a multiple of 3, but not of 6, then S³ is a multiple of 27, which means it is impossible to obtain a sum of cubes that is congruent to a multiple of 6 modulo 6.
• If S is not a multiple of 3, then S³ is congruent to 1 (mod 3) or -1 (mod 3). This means we cannot obtain a sum of cubes that is congruent to a multiple of 6 modulo 6.

Therefore, it is not possible to construct a magic square of cubes of order 6.

Consider a 3x3 cube, where the numbers in each cell are represented as a, b, c, d, e, f, g, h, and i.

The sum of all these numbers is 45 (a + b + c + d + e + f + g + h + i = 45), and the sum of each row, column, and diagonal must be equal to 15.

Let's assume that the sum of the numbers in each row is given by R, and the sum of the numbers in each column is given by C. We can then write the following equations:

a + b + c = R
d + e + f = R
g + h + i = R
a + d + g = C
b + e + h = C
c + f + i = C
a + e + i = C
c + e + g = C

We can then solve these equations to get:

a = (2C - R - e - i) / 2
b = (2C - R - d - f) / 2
c = (2C - R - e - g) / 2
h = (2C - R - b - e) / 2
g = (2C - R - h - i) / 2
f = (2C - R - d - b) / 2

Substituting these expressions into the equation for the sum of all the numbers in the cube, we get:

a + b + c + d + e + f + g + h + i = 45

Simplifying and rearranging terms, we get:

5C - 3R = 45

This equation implies that C and R must be odd and differ by a multiple of 3. However, this is not possible, since the sum of the numbers in each row, column, and diagonal of a 3x3 cube must be equal to 15, which is an odd number. Therefore, it is impossible to construct a semi-magic cube of order 3 using only cubes as the entries.