Find a parameterization for a circle of radius 7 with center \( (2,5,-4) \) in a plane parallel to the xy plane. Write your parameterization so the \( x \) component includes a positive cosine. \( x(t)=\square \) \( y(t)=\square \) \( z(t)=\square \)

To parameterize a circle of radius 7 centered at \( (2,5,-4) \) in a plane parallel to the xy-plane, we can use the following approach with \( t \) as our parameter: - The \( x \) component should include a positive cosine, so we can write it as: \[ x(t) = 2 + 7 \cos(t) \] - The \( y \) component will then complement the \( x \) component for the circle: \[ y(t) = 5 + 7 \sin(t) \] - Since the circle is in a plane parallel to the xy-plane, the \( z \) component remains constant: \[ z(t) = -4 \] In summary: \( x(t) = 2 + 7 \cos(t) \) \( y(t) = 5 + 7 \sin(t) \) \( z(t) = -4 \) Now you're all set to explore circular motions in 3D space!