To determine which two points are collinear with point \( D \), we need to identify the points that lie on the same straight line as point \( D \) in the given figure.

From the image you uploaded:

- Point \( D \) is located on a specific line in the diagram.
- The two points that are collinear with point \( D \) would be any other two points that lie on the same line as point \( D \).

### Analysis of the Figure:

1. **Identifying the Line through Point \( D \):**
   - Observe which line point \( D \) is on. This line may be labeled with other points that are also part of the same line.

2. **Naming the Collinear Points:**
   - If points \( E \) and \( F \) are on the same line as point \( D \), then points \( E \) and \( F \) would be collinear with \( D \).

Based on the information provided:

- If the figure shows that points \( B \) and \( C \) (or any other points) lie on the same line as \( D \), then those would be the points that are collinear with \( D \).

### Summary:

Without seeing specific labels for lines and points in the figure, the two points that are collinear with \( D \) are the two points that lie on the same line as \( D \).

Would you like further details, or do you have any questions?

Here are 5 related questions for further practice:

1. How can you prove mathematically that three points are collinear?
2. If points \( A \), \( B \), and \( C \) are collinear, what is the slope of line \( AB \) compared to line \( BC \)?
3. What is the distance formula for finding the length between two points?
4. Can two lines intersect at more than one point? Why or why not?
5. What is the significance of the midpoint in a line segment?

**Tip:** When identifying collinear points, always ensure that all points lie on the same straight line without deviation.

Learn how to identify collinear points in geometry with a detailed explanation and example. Understand the concept of collinearity and apply the distance formula to determine which points are collinear with point D. Suitable for high school students.

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