Answer:
See below
Step-by-step explanation:
[tex]( \sin \theta + \cos \theta)( \tan \theta + \cot \theta) \\ = \sec \theta + \cosec \theta \\ \\ LHS = ( \sin \theta + \cos \theta)( \tan \theta + \cot \theta) \\ \\ = ( \sin \theta + \cos \theta) \bigg( \frac{\sin \theta}{\cos \theta} + \frac{\cos \theta}{\sin \theta} \bigg) \\ \\ = ( \sin \theta + \cos \theta) \bigg( \frac{\sin ^{2} \theta +\cos ^{2} \theta }{\sin \theta \: \cos \theta} \bigg) \\ \\ = ( \sin \theta + \cos \theta) \bigg( \frac{ 1 }{\sin \theta \: \cos \theta} \bigg) \\ \\ = \frac{ \sin \theta + \cos \theta }{\sin \theta \: \cos \theta} \\ \\ = \frac{ \sin \theta }{\sin \theta \: \cos \theta} + \frac{\cos \theta }{\sin \theta \: \cos \theta}\\ \\ = \frac{ 1 }{\cos \theta} + \frac{1 }{\sin \theta} \\ \\ = \sec \theta + \cosec \theta \\ \\ = RHS[/tex]
