## Magic Squares

So what is so magical about these squares? They're just a bunch of numbers in little squares.

Still unsure? Here's a hint: Take a look at the rows, columns and diagonals.

That's right! A **magic square **is a square grid, generally filled with integers, where the rows, columns and main diagonals sum to the same thing, often known as the **magic constant**.

#### Example

The magic constant for the $3\times3$3×3 grid above is **15**.

**Rows**

- $8+1+6=15$8+1+6=15
- $3+5+7=15$3+5+7=15
- $4+9+2=15$4+9+2=15

**Columns**

- $8+3+4=15$8+3+4=15
- $1+5+9=15$1+5+9=15
- $6+7+2=15$6+7+2=15

**Main Diagonals**

- $8+5+2=15$8+5+2=15
- $6+5+4=15$6+5+4=15

Another cool thing about magic squares is that when you add two magic squares together, they also form another magic square, like such:

##### Question

- What happens when you subtract them?
- What if you multiply them?

The grid entries don't even have to be integers! Look at the following examples below with mixed numbers and decimals!

##### Question

Can you fill in the missing numbers for the magic square on the right?

##### Question

Can you fill in the above magic squares and find their magic constants?

##### Question

There are also magic squares with algebraic terms!

What is the magic constant in the magic square below?

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##### Questions

Look at the following squares:

- What kind of substitution are they asking you to make? Make the substitutions.
- Are these magic squares? If they are, what are their magic constants?

##### Challenge Magic Square

Can you fill out the following magic square?