Question

A wire of length 50 cm is bent into a rectangle. The length of the rectangle is (px + 5) cm. Express the width of the rectangle in terms of p and x.

Answer 1

Answer:

Length of wire =50 m (Given)

Let length of one piece for shape of square =x m

∴ Length of other piece for shape of circle

=(50−x)m

Now perimeter of square =4a=x

⇒a=

4

x

and circumference of circle =2πr=50−x

⇒r=

2π

50−x

Combined Area =a

2

+πr

2

=

16

x

2

+π⋅(

2π

50−x

)

2

=

16

x

2

+π⋅

4π

2

(50−x)

2

A=

16

x

2

+

4π

(50−x)

2

Differentiating w.r. to x, we get

dx

dA

=

16

2x

+

4π

2(50−x)(−1)

dx

dA

=

8

x

+

2π

(x−50)

=

8π

πx+4x−200

=

8π

x(4+π)−200

For extremum,

dx

dA

=0

∴x(4+π)−200=0

x=

4+π

200

dx

2

d

2

A

>0

A is minimum at x=

4+π

200

∴ Length of square of square wire, x=

4+π

200

m

and length of circle wire =50−x

=50−

4+π

200

=

4+π

50π

m

Step-by-step explanation:

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