The Area of a square is 50 sq. units. Then the area of the circle drawn on its diagonal is?

The Radio of areas = area of first circle : area of 2nd circle
= ?r² / ?(3r)²
= ?r²/ 9 ?r²
= 1/9
= 1: 9

Circumference of a circular = 2?r
? 2 x (22 / 7) x r = 440
? r = [440 x (7/22) x (1/2)] = 70 m

? Radius of outer circle = (70 + 14) m
= 84 m

Let outer radius be R and inner radius be r.
Then from question
2?R - 2?r = 66
? 2? (R-r) = 66
? (2 x 22)/7 x (R - r) = 66
? (R-r) = (66 x 7) / 44
= 10.5 m

Distance travelled in 1 revolution = circumference of the wheel
= ?d
= ( 22/7 ) x 63
= 198 cm

So the distance travelled in 100 revolutions = 100 x distance travelled in 1 revolution
= 100 x 198 cm
= 19800 cm
= 198 m

Distance covered in one revolution = total distance travelled / total number of revolution.
= ( 88 x 1000) / 1000 m
= 88 m

We know that the distance covered in one revolution = circumference of the wheel.
? ?d = 88
? 22d / 7 = 88
? d = 28 m

Perimeter of rectangle = Circumference of circle
= 2?r
=2 x ( 22/7 ) x 42
= 264 cm

Now perimeter of rectangle = 2 x ( 6a + 5a )
? 2 x (6a + 5a) = 264
? a = 12

Smaller side of rectangle = 5a
= 60 cm

Circumference of circular plot= 88 m
? 2 x (22/7) x r = 88
? r = 88 x (7/22) x (1/2) = 14 m

Now area = ?r²
=( 22/7) x 14 x 14 m²
= 616 m²

Original circumference = 2?r
New circumference = (150 /100) x 2 ?r
= 3?r

2?R = 3?r
? R = 3r/2
Original area = ?r²
New area = ?R²
= ?9r² / 4 = 9?r²/4

Increase in area = (9?r²/4 ) - (?r²)
= (5/4) ?r²

Req. increase per cent = [{(5/4) ?r²} / {?r²}] x 100
= 125 %

Length of each side of hexagoan = radius of circle
? its perimeter = 6r

Area left ungrazed
= [(63 x 63) - (4 x 1/4 x 22/7 x (63/2)²] m²
= (63 x 63 - (99 x 63)/2 ) m²
= 63 x (63 - 99/2) m²
= 850.5 m²