Area and Perimeter of rectangle...

Area and Perimeter of rectangle

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To solve the problem of finding the area and perimeter of a rectangle, we will follow these steps: ### Step 1: Understand the formulas The area \( A \) of a rectangle is calculated using the formula: \[ A = L \times B \] where \( L \) is the length and \( B \) is the breadth of the rectangle. ...

If a rectangle and a parallelogram are equal in area and have the same base and are situated on the same side, then the quotient: "Perimeter of rectangle"/"Perimeter of parallelogram" is -

Equal to 1

Greater to 1

Less than

Indefinite

If a rectangle and a parallelogram are equal in area and have the same base and are situated on the same side, then the ratio of perimeter of rectangle and that of parallelogram is k, then k is :

`k gt1`

`klt1`

`k=1`

can't be determined

Area of a rectangle = L xx B Perimeter of a rectangle = 2(L + B) where L and B are the length and breadth of the rectangle respectively. Find the area of a rectangular park whose perimeter is 300 and breadth is 50 m.

`500 m^(2)`

`100 m`

`5000m^(2)`

`1000 m^(2)`

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Area and Perimeter of rectangle

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If a rectangle and a parallelogram are equal in area and have the same base and are situated on the same side, then the quotient: "Perimeter of rectangle"/"Perimeter of parallelogram" is -

If a rectangle and a parallelogram are equal in area and have the same base and are situated on the same side, then the ratio of perimeter of rectangle and that of parallelogram is k, then k is :

Area of a rectangle = L xx B Perimeter of a rectangle = 2(L + B) where L and B are the length and breadth of the rectangle respectively. Find the area of a rectangular park whose perimeter is 300 and breadth is 50 m.

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