The area of rectangular ground, having ratio of its side 5: 3. is 3375 m. If its
length is increased by 5 mand breadth is decreased by 5 m. then find its effect
on the a
Answers
Answer:
Given -
Area of ground = 3375m²
Ratio of length and breadth = 5 : 3
To find -
Area of ground (after having changes in L and B).
Formula used -
Area of rectangle.
Solution -
In the question, we arr provided with the ratio of sides of a rectangular ground, and the area. And some changes are made in the L and B of the ground, and we need to find the area of the ground. For that we will first take the common ratio, then we will apply the formula of area of rectangle, then we will find the value of that common ratio, then we will multiply it with the L and B, after that we will obtain, new L and B, from that we will find the new area, so, Let's do it!
So -
Let the common ratio be termed as x
5 = 5x m
3 = 3x m
Area = 3375m²
Now -
We will find the value of x, by applying the formula of area of rectangle.
Area of rectangle = L × B
where -
L = Length
B = Breadth
On substituting the values -
Area = L × B
3375 = 5x × 3x
3375 = 15x²
x² = 225
x = 15
Now -
We have obtained the value of x, so, now, we will multiply 5x and 3x with, 15, and that will be the new L and B of the rectangle, then we will find it's area, and it is also written, that 5m is increased in Length and 5m decrease in breadth, we will also do that.
So -
5x = 5 × 15 = 75m
3x = 3 × 15 = 45m
After increase and decrease in L and B -
New Length = 75m + 5m = 80m
New Breadth = 45m - 5m = 40m
At the end -
We will find the new area, by again applying the formula of area of rectangle.
Area of rectangle = L × B
New area = 80m × 40m
New area = 3200m²
Verification -
Of 1st area -
75m × 45m = 3375m²
3375m² = 3375m²
________________________________________________________
Answer:
Given -
Area of ground = 3375m²
Ratio of length and breadth = 5 : 3
To find -
Area of ground (after having changes in L and B).
Formula used -
Area of rectangle.
Solution -
In the question, we arr provided with the ratio of sides of a rectangular ground, and the area. And some changes are made in the L and B of the ground, and we need to find the area of the ground. For that we will first take the common ratio, then we will apply the formula of area of rectangle, then we will find the value of that common ratio, then we will multiply it with the L and B, after that we will obtain, new L and B, from that we will find the new area, so, Let's do it!
So -
Let the common ratio be termed as x
5 = 5x m
3 = 3x m
Area = 3375m²
Now -
We will find the value of x, by applying the formula of area of rectangle.
Area of rectangle = L × B
where -
L = Length
B = Breadth
On substituting the values -
Area = L × B
3375 = 5x × 3x
3375 = 15x²
.
x² = 225
.
x = 15
Now -
We have obtained the value of x, so, now, we will multiply 5x and 3x with, 15, and that will be the new L and B of the rectangle, then we will find it's area, and it is also written, that 5m is increased in Length and 5m decrease in breadth, we will also do that.
So -
5x = 5 × 15 = 75m
3x = 3 × 15 = 45m
After increase and decrease in L and B -
New Length = 75m + 5m = 80m
New Breadth = 45m - 5m = 40m
At the end -
We will find the new area, by again applying the formula of area of rectangle.
Area of rectangle = L × B
New area = 80m × 40m
New area = 3200m²
Verification -
Of 1st area -
75m × 45m = 3375m²
3375m² = 3375m²
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