IF A PERIMETER OF A RECTANGLE IS 450 m square and the length is twice is breadth then find the length breadth and area of the same rectangle?
Answers
Step-by-step explanation:
If the Perimeter of a rectangle is 450 square and the length is twice it's breath, then find the length, breadth and area of the same rectangle.
\tt\underline{Given :-}
Given:−
Perimeter of rectangle = 450 m
Let us assume that Breadth = x
\tt\underline{So,}
So,
Length = 2x
\boxed{\purple{\bf{P\:=\:2(a\:+\:b)}}}
P=2(a+b)
\tt\underline{So,}
So,
450 = 2(2x + x)
⟹ 450 = 2(3x)
⟹ 450 = 6x
⟹ x = 450/6
⟹ x = 75
Let us put the value of x
Length = 2x = 2(75) = 150 m
Breathe = x = 75
Now let us find the area,
\boxed{\purple{\bf{A\:=\:l\:×\:b}}}
A=l×b
Area = 150 × 75
= 11,250 m²
\tt\underline{Required\: Answer :-}
RequiredAnswer:−
Length of the rectangle = 150 m
Answer:
If the Perimeter of a rectangle is 450 square and the length is twice it's breath, then find the length, breadth and area of the same rectangle.
\tt\underline{Given :-}Given:−
Perimeter of rectangle = 450 m
Let us assume that Breadth = x
\tt\underline{So,}So,
Length = 2x
\boxed{\purple{\bf{P\:=\:2(a\:+\:b)}}}P=2(a+b)
\tt\underline{So,}So,
450 = 2(2x + x)
⟹ 450 = 2(3x)
⟹ 450 = 6x
⟹ x = 450/6
⟹ x = 75
Let us put the value of x
Length = 2x = 2(75) = 150 m
Breathe = x = 75
Now let us find the area,
\boxed{\purple{\bf{A\:=\:l\:×\:b}}}A=l×b
Area = 150 × 75
= 11,250 m²
\tt\underline{Required\: Answer :-}RequiredAnswer:−
Length of the rectangle = 150 m
Breathe of the rectangle = 75 m
Area of the rectangle = 11,250