Answer to Question #164876 in Trigonometry for Jankarlos

"\\text{From the diagram |BC| represents the height the crow travelled after flying 80m north ward }\n\\text{|OA|=60m; |AB|=80m |BC|=30m}\n\\text{Note: Triangle OBC is right angled }\n\\text{In triangle OAB using pythagoras' theorem we have }\\\\\n|OB|^2=|OA|^2+|AB|^2 \\\\\n|OB|=\\sqrt{|OA|^2+|AB|^2}=\\sqrt{60^2+80^2}=\\sqrt{3600+6400}=\\sqrt{10000}=100\\\\\n|OB|=100m\\\\\n(ii)\\text{ The distance of the crow from the nest}=|OC|\\\\\n\\text{In triangle OBC using pythagoras' theorem we have:}\\\\\n|OC|^2=|OB|^2+|BC|^2\\\\\n|OC|=\\sqrt{|OB|^2+|BC|^2}=\\sqrt{100^2+30^2}=\\sqrt{10000+900}=\\sqrt{10900}=104.40306509\\\\\n\\text{The distance of the crow from its nest is 104.40306509m}\\approx104m\\\\\n(iii)\\text{The angle of elevation the baby crow will look is < BOC}\\\\\n\\text{In triangle OBC } \\tan(<BOC) =\\frac{|BC|}{|OB|}=\\frac{30}{100}=0.3\\\\\n<BOC=\\tan^{-1}(0.3)=16.699^o\\approx17^o\\\\\n\\text{Therefore the baby crow must look }17^o\\text{ upward to see the adult crow}"