Question

the length of the rectangular field is twice its breadth if the perimeter of the field is 150 M find its side​

Answer 1

Answer:

Length is 50 and Breadth is 25

Step-by-step explanation:

Let the length be x

breadth be y

the length of the rectangular field is twice its breadth => x = 2y

perimeter = 150 m

As we know

perimeter of rectangle = 2 ( l + b)

=> 2 ( x + y ) = 150

=> 2 ( 2y + y) = 150

=> 2( 3y) = 150

=> 6y = 150

=> y = 150/6

=> y = 25

So, breadth = 25

length = 2y = 25 * 2 = 50

Answer 2

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Answer:

Lenght = 50 m

Breadth = 25 m

Step-by-step explanation:

Let, the breadth of the rectangular field be, 'x'

It is given that the length of the rectangular field is twice of its breadth.

So, the length is = (x*2)

                           = 2x

The perimeter of the field is = 150 m.

We know that,

Perimeter = 2(length + breadth)

∴ 150 = 2(2x+x)

⇒ 150 = 2*3x

⇒ 150 = 6x

⇒ 6x = 150

⇒ x = 150/6

⇒ x = 25

∴ The breadth of the rectangular field is 25 m

∴ The length of the field is = (25*2) m

                                            = 50 m

∴ The sides of the rectanguler field are 50 m and 25 m.

Check wheather the calculation is right or wrong:

Length = 50 m

Breadth = 25 m

Perimeter = 2(length + breadth)

                = 2(50+25)

                = 2*75

                = 150 m