https://file.aiquickdraw.com/mathbot/file/172564196342703uon8k4.jpg

The image you provided appears to show a right triangle inscribed in a circle. Here's the key information from the image:

- There is a circle with a radius marked as \( 6 \).
- A right triangle is inscribed inside the circle, with one leg measuring \( 3 \).
- The angle \( \theta \) is marked inside the triangle, indicating the angle between the two legs.

Given the information provided, the problem might be asking for the length of the hypotenuse, or possibly the sine or cosine of the angle \( \theta \).

Would you like me to calculate any specific property, such as the length of the remaining side, the hypotenuse, or the angle \( \theta \)?

Explore the properties of a right triangle inscribed in a circle with a radius of 6 and one leg measuring 3. Learn to calculate the hypotenuse, angles, and trigonometric ratios using the Pythagorean theorem and inscribed angle theorem. Suitable for students in Grades 9-12.

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