Math / Geometry

QuestionWrite a rule for the glide reflection that maps $\triangle D E F$ to $\triangle D^{\prime} E^{\prime} F^{\prime}$ .
Choose the correct answer below. A. $\left(T_{\langle-6,0\rangle}{ }^{\circ} r_{x-2 x i s}\right)(\triangle D E F)=\triangle D^{\prime} E^{\prime} F^{\prime}$ B. $\left(T_{\langle 6,2\rangle}{ }^{\circ} r_{x \text {-axis }}\right)(\triangle D E F)=\triangle D^{\prime} E^{\prime} F^{\prime}$ C. $\left(T_{\langle 0,6\rangle} \circ r_{y-a x i s}\right)(\triangle D E F)=\triangle D^{\prime} E^{\prime} F^{\prime}$ D. $\left(T_{\langle 2,6\rangle}{ }^{\circ} r_{y-a x i s}\right)(\triangle D E F)=\triangle D^{\prime} E^{\prime} F^{\prime}$

Studdy Solution
The correct glide reflection is not listed in the options.
The correct transformation is $T_{\langle -6, 6 \rangle} \circ r_{x\text{-axis}}$ ( $\triangle DEF$ ) $= \triangle D'E'F'$ .

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