Area of a four walls a room is 168 Sq. meters . The breadth and height of a room are 8 meters and 6 meters respectively . The length of the room is?

Let the length, breadth and height of the room be l, b and h respectively

As per question
Cost of 2(l + b) x h = Rs. 48
? Required cost = cost of 2 (2l + 2b) x 2h
= cost of 4 [2(l + b) x h ]
= 4 x Rs. 48
= Rs. 192

Area of the plot = (3 x 1200) m²
= 3600 m²

Let breadth = y meters
Then Length = 4y meters,
Now area = 4y x y = 3600 m²
? y² = 900 m²
? y = 30 m

? Length of plot = 4y m
= (4 x 30) m
=120 m

Area of the square = (84 + 84) m²
Area of the rectangle = (144 x width) m²

From question both area would be same,
? Width = (84 x 84) / 144 m = 49 m

Let length of rectangular field = 5y,
so width = 4y.

From question
5y - 4y = 20m
? x = 20m
? Length = (5 x 20)m = 100 m
Breadth = (4 x 20) m = 80 m

? Perimeter = 2 (100 + 80 ) m = 360 m

Let breadth = b meters.
then, length = 3b/2 meters
? b x 3b/2 = 2/3 X 10000
? b² = (4 x 10000)/9
? b = ( 2 X 100)/3 m
? Length = (3/2) x (2/3) x 100 m
= 100 m

Area of four walls = 2 x (l + b ) x h
? 2 x (7.5 + 3.5 ) x h = 77 m²
? h = 77 / (2 x 11) = 7/2
? h = 3.5 meters

Breadth of the rectangle = (150/15) cm
= 10 cm

New area = (4/3 x 150) cm²
= 200 cm²

New length = 200/10 cm
=20 cm

New perimeters = 2(20 + 10) cm
= 60 cm

Let the width of the room be x members
Then, its area = (4x) m²

Area of each new square room = (2x)m²
Let the side of each new room = y meters
Then, y² = 2x
Clearly, 2x is a complete square when x=2
? y² = 4
? y = 2 m .

Let the side of the square = 100 m
So area of square = 100 x 100 = 10000.
New length = 140 m,
New breadth = 130 m

Increase in area = [(140 x 130) - (100 x 100)] m²
= 8200 m²

? Required increase percent = (8200/ 10000) x 100 % = 82%

Area of verandah = [(25 x 20) -(20 x 15)] m²
= 200 m²
? Cost of flooring = Rs. (200 x 3.50)
= Rs. 700