To solve the equation \( ?^? = 9 \), we can look for values that satisfy this condition. There are a couple of common solutions: 1. **When \( ? = 3 \)**: \[ 3^2 = 9 \] 2. **When \( ? = 9 \)**: \[ 9^1 = 9 \] Therefore, the possible solutions for \( ? \) are \( 3 \) and \( 9 \). If you are looking for solutions in the complex numbers or other exponents, please specify!

?^2 = 49

To solve the equation \( ?^2 = 49 \), we can take the square root of both sides.

The square root of 49 is 7. Therefore, there are two solutions:

\[ ? = 7 \quad \text{or} \quad ? = -7 \]

So, the two possible values for \( ? \) are 7 and -7.

?^2 = 64

To solve the equation \( ?^2 = 64 \), we take the square root of both sides.

The square root of 64 is 8. Therefore, there are two solutions:

\[ ? = 8 \quad \text{or} \quad ? = -8 \]

So, the two possible values for \( ? \) are 8 and -8.

?^? = 9

To solve the equation \( ?^? = 9 \), we can look for values that satisfy this condition.

There are a couple of common solutions:

When \( ? = 3 \): \[ 3^2 = 9 \]
When \( ? = 9 \): \[ 9^1 = 9 \]

Therefore, the possible solutions for \( ? \) are \( 3 \) and \( 9 \).

If you are looking for solutions in the complex numbers or other exponents, please specify!

?^3 = 9

To solve the equation \( ?^3 = 9 \), we take the cube root of both sides.

\[ ? = \sqrt[3]{9} \]

The cube root of 9 can also be expressed as:

\[ ? \approx 2.08008 \]

So, the solution for \( ? \) is approximately \( 2.08 \).

If you are looking for an exact form, it can be written as:

\[ ? = 9^{1/3} \]

This represents the principal (real) cube root of 9.

?^2 = 9

To solve the equation \( ?^2 = 9 \), we can take the square root of both sides.

The square root of 9 is 3, so there are two possible solutions:

\[ ? = 3 \quad \text{or} \quad ? = -3 \]

Therefore, the two possible values for \( ? \) are \( 3 \) and \( -3 \).