Maths-
General
Easy
Question
Calculate the amount of ice cream this cone can hold (just to the top of the cone). Round to the nearest hundredth.
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)
- 58.29 cm3
- 58.29 cm3
- 233.15 cm3
- 233.15 cm³
Hint:
Volume of a cone = (
)πr2h
The correct answer is: 58.29 cm3
We have given the dimensions of a ice cream cone
Diameter = 4.5 cm
Radius , r = 4.
= 2.25 cm
Height , h = 11 cm
We have to find the volume of the given cone
We know that
Volume of a cup = (1/3)πr2h
= (
)(3.14)(2.25 x 2.25)(11)
= (
)(3.14) (5.06 x 11)
= (
)(3.14)(55.68)
= 174.![85 over 3](data:image/png;base64,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)
= 58.29 cm3
Therefore, the volume of ice cream cone is 58.29 cm3
Therefore correct option is a)58.29 cm3.
Therefore, the volume of ice cream cone is 58.29 cm3
Therefore correct option is a)58.29 cm3.
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![negative 3 x cubed plus 18 x squared minus 27 x](data:image/png;base64,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)
Factor the given expression completely.
![negative 3 x cubed plus 18 x squared minus 27 x](data:image/png;base64,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)
Maths-General
Maths-
Find the height of a cuboid whose base area is 180cm2 and volume is 900cm2
Find the height of a cuboid whose base area is 180cm2 and volume is 900cm2
Maths-General
Maths-
A cone has a circular base of radius 6m and volume 84π m³. The height of cone is
A cone has a circular base of radius 6m and volume 84π m³. The height of cone is
Maths-General