Answer to Question #156056 in Trigonometry for anne

Let the poster is of width "a" and length "b". Then "b=\\frac{180}{a}". Let us sketch the picture:

It follows that the printed part of poster is of width "a-2" and length "b-3". The printed area is equal

"S(a)=(a-2)(\\frac{180}{a}-3)=186-\\frac{360}{a}-3a".

Then "S'(a)=\\frac{360}{a^2}-3". If "S'(a)=0" , then "3a^2=360", and thus "a=\\sqrt{120}=2\\sqrt{30}" (since "a>0"). It follows that "b=\\frac{180}{2\\sqrt{30}}=3\\sqrt{30}". Since "S'(a)=-\\frac{720}{a^3}<0" for "a>0", we conclude that "a=2\\sqrt{30}" is a point of maximum of area function "S(a)". Therefore, the largest printed area for poster of width "2\\sqrt{30}" and length "3\\sqrt{30}."