From your message, it seems you have specific values for \( X \) and \( Y \) and are looking to formulate an equation. The values provided are:
- \( X = -1 \)
- \( Y = 2160 \)
You seem to be indicating a relationship between \( X \) and \( Y \) that we need to express mathematically in the form of an equation \( Y = f(X) \).
If these values represent a linear relationship, we can look for a simple linear equation of the form:
\[ Y = mX + b \]
where \( m \) is the slope and \( b \) is the y-intercept. However, to determine the slope, we'd need more than one point, so let’s consider if you provided any additional context or values.
If \( X \) is not just \(-1\) and if you meant that the relationship follows a certain pattern where these values provided are special, please clarify.
Otherwise, if we just consider these values, and specifically want to see what the relationship could look like, we might say:
\[ Y = \frac{2160}{(-1)^{10}} = 2160 \]
This means that when \( X = -1 \) (raised to an even power, which equals 1), \( Y\) remains constant at 2160. However, this is a simple interpretation based on the information provided.
If you have more points or specifications about how \( Y \) should change with respect to \( X \), please provide that, and I can help you find a more precise equation!