Mathematics
Grade-7
Easy
Question
Determine the radius of the circle with an area of 50.24 square inch.
- 8
- 2
- 4
- 17
Hint:
we know the area of the circle ![πr squared](data:image/png;base64,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)
The correct answer is: 4
Related Questions to study
Mathematics
Determine the area swept by a clock’s minute hand in one-hour. If the length of the minute hand is 10.2 cm.
Determine the area swept by a clock’s minute hand in one-hour. If the length of the minute hand is 10.2 cm.
MathematicsGrade-7
Mathematics
The area of a circle having 10 yards radius is ________ square yards.(Take
= 3.14)
The area of a circle having 10 yards radius is ________ square yards.(Take
= 3.14)
MathematicsGrade-7
Mathematics
Determine area of the circle, from the picture given below. (Take
= 3.14)
![](data:image/png;base64,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)
Determine area of the circle, from the picture given below. (Take
= 3.14)
![](data:image/png;base64,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)
MathematicsGrade-7
Mathematics
Determine the area of the circle having 21 cm as radius.
Determine the area of the circle having 21 cm as radius.
MathematicsGrade-7
Mathematics
The circumference of a circular rug is 24.8 meters. Determine the area of the rug.
The circumference of a circular rug is 24.8 meters. Determine the area of the rug.
MathematicsGrade-7
Mathematics
Arthur ran a circular field 3times. If he ran a total distance of 750 m. Determine the area of the field.
Arthur ran a circular field 3times. If he ran a total distance of 750 m. Determine the area of the field.
MathematicsGrade-7
Mathematics
Determine the area of circle with a circumference of 25.12 meters.
Determine the area of circle with a circumference of 25.12 meters.
MathematicsGrade-7
Mathematics
A school playground has an area of 113.04 square yards. Determine the diameter of the ground.
A school playground has an area of 113.04 square yards. Determine the diameter of the ground.
MathematicsGrade-7
Mathematics
The area of a circle is 154 square feet. Determine its perimeter.
The area of a circle is 154 square feet. Determine its perimeter.
MathematicsGrade-7
Mathematics
Determine the radius of the circle with an area of 28.26 square feet.
Determine the radius of the circle with an area of 28.26 square feet.
MathematicsGrade-7
Mathematics
Determine the area of the circle having 9 meters as its diameter.
Determine the area of the circle having 9 meters as its diameter.
MathematicsGrade-7
Mathematics
The area of a circle having 8 inch radius is ________ square inch. (Take
= 3.14)
The area of a circle having 8 inch radius is ________ square inch. (Take
= 3.14)
MathematicsGrade-7
Mathematics
Determine the radius of the circle having 50.24 units as circumference.
Determine the radius of the circle having 50.24 units as circumference.
MathematicsGrade-7
Mathematics
Determine the diameter of the circle if the area of the square is 2.56 square feet.
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)
Determine the diameter of the circle if the area of the square is 2.56 square feet.
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)
MathematicsGrade-7
Mathematics
A circular racetrack has a diameter of mile. Calculate the distance traveled by car in one lap around the track.
A circular racetrack has a diameter of mile. Calculate the distance traveled by car in one lap around the track.
MathematicsGrade-7