Advertisements
Advertisements
प्रश्न
The dimensions of a rectangular field are 50 m and 40 m. A flower bed is prepared inside this field leaving a gravel path of uniform width all around the flower bed. The total cost of laying the flower bed and gravelling the path at Rs. 30 and Rs. 20 per square metre, respectively, is Rs. 52,000. Find the width of the gravel path.
Advertisements
उत्तर १
Let the width of the gravel path be w m.
Length of the rectangular field = 50 m
Breadth of the rectangular field = 40 m
Let the length and breadth of the flower bed be x m and y m respectively.
Therefore, we have:
x + 2w = 50 ...(1)
y + 2w = 40 ...(2)
Also, area of rectangular field = 50 m 40 m = 2000 m2
Area of the flower bed = xy m2
Area of gravel path = Area of rectangular field – Area of flower bed = (2000 – xy) m2
Cost of laying flower bed + Gravel path = Area × cost of laying per sq. m
52000 = 30 xy + 20 (2000 – xy)
52000 = 10xy + 40000
xy = 1200
Using (1) and (2), we have:
(50 – 2w)(40 – 2w) = 1200
2000 – 180w + 4w2 = 1200
4w2 – 180w + 800 = 0
w2 – 45w + 200 = 0
w2 – 5w – 40w + 200 = 0
w(w – 5) – 40(w – 5) = 0
(w – 5)(w – 40) = 0
w = 5, 40
If w = 40, then x = 50 – 2w = –30, which is not possible.
Thus, the width of the gravel path is 5 m.
उत्तर २
Dimensions of the outer rectangle (field) = 50 m × 40 m
Total area = 50 × 40 = 2000 m2
Length = 50 − 2x
Width = 40 − 2x
Abed = (50 − 2x) (40 − 2x)
Apath = Total Area − Area of flower bed
= 2000 − (50 − 2x) (40 − 2x)
Total Cost
-
Cost of flower bed = ₹30/m²
-
Cost of gravel path = ₹20/m²
-
Total cost = ₹52,000
Total cost = 30 × Area of bed + 20 × Area of path
52000 = 30(50 − 2x) (40 − 2x) + 20[2000 − (50 − 2x) (40 − 2x)]
Let A = (50 − 2x) (40 − 2x)
52000 = 30A + 20(2000 − A)
= 30A + 40000 − 20A = 10A + 40000
⇒ 10A = 52000 − 40000 = 12000
⇒ A = 1200
(50 − 2x) (40 − 2x) = 1200
(50 − 2x) (40 − 2x) = 1200
2000 − 100x − 80x + 4x2 = 1200
4x2 − 180x + 2000 = 1200
4x2 − 180x + 800 = 0
4x2 − 180x + 800 = 0
x2 − 45x + 200 = 0
`x = 45 +- sqrt((-45)^2 - 4(1)(200))/(2(1)) = (45 +- sqrt(2025-800))/2`
`= (45 +- sqrt1225)/2 = (45 +- 35)/2`
so
`x= (45+35)/2 = 40`
`x = (45-35)/2 = 5`
Width of the gravel path is 5 metres.
संबंधित प्रश्न
The sides of a right-angled triangle containing the right angle are 4x cm and (2x – 1) cm. If the area of the triangle is 30 cm2; calculate the lengths of its sides.
The hypotenuse of a right-angled triangle is 26 cm and the sum of other two sides is 34 cm. Find the lengths of its sides.
The diagonal of a rectangle is 60 m more than its shorter side and the larger side is 30 m more than the shorter side. Find the sides of the rectangle.
An area is paved with square tiles of a certain size and the number required is 128. If the tiles had been 2 cm smaller each way, 200 tiles would have been needed to pave the same area. Find the size of the larger tiles.
A farmer has 70 m of fencing, with which he encloses three sides of a rectangular sheep pen; the fourth side being a wall. If the area of the pen is 600 sq. m, find the length of its shorter side.
The area of a big rectangular room is 300 m2. If the length were decreased by 5 m and the breadth increased by 5 m; the area would be unaltered. Find the length of the room.
A car made a run of 390 km in ‘x’ hours. If the speed had been 4 km/hour more, it would have taken 2 hours less for the journey. Find ‘x’.
In the given figure, the value of x is ______.
The area of the given rectangle is 60 sq. m and its longer side is 10 m, the perimeter of the rectangle is ______.
The length of a rectangle is 3 m more than its width. If its area is 180 m2; the length of the rectangle is ______.
