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mary needs 50 ft of fence to protect her rectangular garden from squirrels. How long and how wide is the garden if the length is 8 ft more than the width

Zlenyk asked Jan 20, 2023

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Girish Gupta · Answer 1 · 2023-01-22T17:10:10+0000

Given :

Mary needs 50 ft of fence to protect her rectangular garden from squirrels.

The length is 8 ft more than the width of the garden.

⠀

To Find :

The dimensions of the garden.

⠀

Solution :

Let us assume the length of the garden as x ft and therefore, the width will become (x - 8) ft.

We know that,

$\qquad{ \sf{ \pmb{2(Length + Width ) = Perimeter_((rectangle))}}}$

⠀

Substituting the values in the formula :

${ \dashrightarrow\qquad{ \sf{2(x + x - 8 ) = 50}}}$

${ \dashrightarrow\qquad{ \sf{2(2x- 8 ) = 50}}}$

${ \dashrightarrow\qquad{ \sf{4x- 16 = 50}}}$

${ \dashrightarrow\qquad{ \sf{4x = 50 + 16}}}$

${ \dashrightarrow\qquad{ \sf{x = (66)/(4) }}}$

${ \dashrightarrow\qquad{ \bf{x = 16.5}}}$

Therefore,

The Length of the garden is 16.5 ft .

⠀

${ \dashrightarrow\qquad{ \sf{Width_((Garden)) = x - 8}}}$

${ \dashrightarrow\qquad{ \sf{Width_((Garden)) = 16.5 - 8}}}$

${ \dashrightarrow\qquad{ \bf{Width_((Garden)) = 8.5}}}$

⠀

Therefore,

The Width of the garden is 8.5 ft .

⠀

Hence,

The dimensions of the rectangular garden is 16.5 ft and 8.5 ft.

Harlan T Wood · Answer 2 · 2023-01-26T20:22:53+0000

$\bold{\huge{\underline{ Solution }}}$

Given :-

Mary needs 50 ft of fence to protect her rectangular garden from squirrel
The length of the garden is 8 ft more than the width

To Find :-

We have to find the length and breath of the rectangular garden

Let's Begin :-

Mary needs 50ft of fence to protect her rectangular garden from squirrel

Therefore,

We can conclude that

The perimeter of the rectangular garden

$\bold{ = 50\: ft}$

We know that,

Perimeter of the rectangle

$\sf{ = 2( Length + Breath) }$

Here, we have
Length of the garden that is 8ft more than the width

Let assume the width of the garden be x

According to the question

$\sf{ Perimeter\:of\:rectangle = 2( x + 8 + x) }$

$\sf{ 50 = 2( x + 8 + x) }$

$\sf{ 50 = 2( 2x + 8)}$

$\sf{ 50 = 4x + 16}$

$\sf{ 50 - 16 = 4x }$

$\sf{ 34 = 4x }$

$\sf{ x = }{\sf{(34)/(4)}}$

$\sf{ x = 8.5 }$

Thus, The breath of the garden is 8.5 ft

Therefore,

The length of the garden

$\sf{ = x + 8}$

$\sf{ = 8.5 + 8}$

$\sf{ = 16.5\: ft }$

Hence, The length and breath of the rectangle are 8.5ft and 16.5ft .

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Given :-

To Find :-

Let's Begin :-

Therefore,

Therefore,

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