2. \( * * \) SHOW WORK ON PAPER REQUIRED FOR THIS QUESTION*** A pool ball bounces off the sides of a rectangular pool table in such a way that \( \angle 1 \cong \angle 3, \angle 4 \cong \angle 6 \), and \( \angle 3 \) and \( \angle 4 \) are complementary. If \( m \angle 1=33^{\circ} \), find \( m \angle 3, m \angle 4 \), and \( m \angle 5 \). \( m \angle 3= \) \( m \angle 4= \) \( m \angle 5= \)
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To find the angles involved, we can apply the properties of congruent and complementary angles given in the problem. Since \( m \angle 1 = 33^{\circ} \) and \( \angle 1 \cong \angle 3 \), we have: \( m \angle 3 = 33^{\circ} \). Next, we're told that \( \angle 3 \) and \( \angle 4 \) are complementary, meaning they add up to \( 90^{\circ} \). Thus: \[ m \angle 4 = 90^{\circ} - m \angle 3 \] \[ m \angle 4 = 90^{\circ} - 33^{\circ} = 57^{\circ} \]. We know that \( \angle 4 \cong \angle 6 \), so: \[ m \angle 6 = m \angle 4 = 57^{\circ} \]. Finally, angles \( 5 \) and \( 6 \) together form a straight line (along the edge of the table), so: \[ m \angle 5 + m \angle 6 = 180^{\circ} \] \[ m \angle 5 = 180^{\circ} - 57^{\circ} = 123^{\circ} \]. Thus, we find: \( m \angle 3 = 33^{\circ} \) \( m \angle 4 = 57^{\circ} \) \( m \angle 5 = 123^{\circ} \)
