Question

To determine the number of centimeters in 1 inch using the provided information that the dot is at (4, 11) on the graph, we interpret the coordinates as follows:

- The x-coordinate (4) represents inches.
- The y-coordinate (11) represents centimeters.

This means that when there are 4 inches, there are 11 centimeters. To find the number of centimeters in 1 inch, we can set up a proportion:

\[
\frac{11 \text{ cm}}{4 \text{ in}} = \frac{x \text{ cm}}{1 \text{ in}}
\]

Cross-multiplying gives us:

\[
11 \text{ cm} = 4x \text{ cm}
\]

Solving for \(x\) gives:

\[
x = \frac{11}{4} \approx 2.75 \text{ cm}
\]

Thus, there are approximately 2.75 centimeters in 1 inch.

Let's clarify the calculation based on the dot position you provided, which is (4, 11). This indicates that:

- At 4 inches (the x-coordinate), there are 11 centimeters (the y-coordinate).

To find out how many centimeters are in 1 inch, we can use the ratio given by these points:

\[
\text{If } 4 \text{ inches} = 11 \text{ centimeters}
\]

We want to find the number of centimeters (let's call it \( x \)) in 1 inch:

\[
\frac{11 \text{ cm}}{4 \text{ in}} = \frac{x \text{ cm}}{1 \text{ in}}
\]

Cross-multiplying gives us:

\[
11 \text{ cm} = 4x \text{ cm}
\]

Now, divide both sides by 4 to solve for \( x \):

\[
x = \frac{11}{4} = 2.75 \text{ cm}
\]

Based on this calculation, there are **2.75 centimeters in 1 inch** based on the data point provided.

If this result is incorrect based on your understanding, please provide more context or details so that I can assist you better!