The dimensions of a cuboid are in the ratio 3:2:2 and the lateral surface area of the cuboid is 200 m²
. The
outer surface of the cuboid is painted with enamel at the rate of ₹ 10 per m². Find the total cost of painting
the outer surface of the cuboid. ;₹ 3200)
Answers
Step-by-step explanation:
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TheValkyrie
Verified answer
Answer:
Total cost of painting the cuboid = Rs.3200
Step-by-step explanation:
Given:
The dimensions of cuboid are in the ratio 3 : 2 : 2
Cost of painting = Rs 10 per m²
To Find:
Total cost of painting
Concept:
First find the dimensions of the cuboid. Next find the total surface area and multiply it with the cost per m² to find the total cost of painting the cuboid.
Solution:
First we have to find the dimensions of the cuboid.
Let the length of the cuboid be 3x.
Let the breadth of the cuboid be 2x.
Let the height of the cuboid be 2x.
Now by given,
Lateral surface area of the cuboid = 200 m²
But we know that,
LSA of a cuboid = 2h (l + b)
where h is the height
l is the length
b is the breadth
Hence,
2h (l + b) = 200
Substitute the data,
2 × 2x (3x + 2x) = 200
4x × 5x = 200
20x² = 200
x² = 200/20
x² = 10
x = √10
Hence,
Length of cuboid = 3x = 3√10 m
Breadth of cuboid = 2x = 2√10 m
Height of cuboid = 2x = 2√10 m
Now we have to find the total surface area of the cuboid.
TSA of a cuboid is given by,
TSA of cuboid = 2 (lb + bh + hl)
Substitute the data,
TSA of cuboid = 2 (3√10 × 2√10 + 2√10 × 2√10 + 2√10 × 3√10)
TSA of cuboid = 2 ( 60 + 40 + 60)
TSA of cuboid = 2 × 160
TSA of cuboid = 320 m²
Hence total surface area of cuboid is 320 m²
Now we have to find the total cost of painting.
Total cost of painting = TSA × Cost per m²
Substitute the data,
Total cost of painting = 320 × 10
Total cost of painting = 3200 rupees.
Hence the total cost of painting the cuboid is Rs.3200.