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Solution — 2017 Question 3 Differentiation & Applications

(a)

Let L cm be the length of the rectangle.

Perimeter of sign:

2L+2πx=102L=10−2πxL=5−πx

Area of sign:

A=2xL+πx2=2x(5−πx)+πx2=10x−2x2π+πx2=10x−x2π=x(10−xπ)∎
(b)
A=x(10−πx)=10x−x2πdAdx=10−π(2x)=10−2πx

At maximum area, dAdx=0

10−2πx=02πx=10x=5π∎

When x=5π,

A=x(10−πx)=5π(10−π(5π))=25π∎ cm2
dAdx=10−2πxd2Adx2=−2π

Since d2Adx2<0, the area is a maximum. ∎

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Parts

  • Part (a)
  • Part (b)