The \( m \angle D \) is supplementary to the \( m \angle E \). The \( m \angle F \) is supplementary to the \( m \angle E \). If \( m \angle F=113^{\circ} \), what is the \( m \angle D \) and the \( m \angle E \) ?
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Since \( m \angle F \) is supplementary to \( m \angle E \), we know that: \[ m \angle F + m \angle E = 180^\circ \] Substituting \( m \angle F = 113^\circ \): \[ 113^\circ + m \angle E = 180^\circ \] To find \( m \angle E \), we subtract \( 113^\circ \) from \( 180^\circ \): \[ m \angle E = 180^\circ - 113^\circ = 67^\circ \] Now, since \( m \angle D \) is also supplementary to \( m \angle E \): \[ m \angle D + m \angle E = 180^\circ \] Substituting \( m \angle E = 67^\circ \): \[ m \angle D + 67^\circ = 180^\circ \] To find \( m \angle D \), we subtract \( 67^\circ \) from \( 180^\circ \): \[ m \angle D = 180^\circ - 67^\circ = 113^\circ \] So, \( m \angle D = 113^\circ \) and \( m \angle E = 67^\circ \).
