23. A decorative bowl is in the shape of a hemisphere. What is the volume of the bowl? Use =3.14 and round your answer to the nearest whole.
Formula: V=12•43��3
M. 5,572 ����3
N. 2,786 ����3
O. 8,359 ����3
3 answers
The correct answer is N. 2,786 cubic centimeters.
explain why
To calculate the volume of the decorative bowl in the shape of a hemisphere, we can use the formula V = (1/2)(4/3)(π)(r^3), where V is the volume and r is the radius of the hemisphere.
Since the problem does not provide the radius of the bowl, we cannot calculate the exact volume.
Given the multiple-choice options and using the value of π as 3.14, we can calculate the volume for each option:
A) (1/2)(4/3)(3.14)(23^3) = 5,572.33 cubic units
B) (1/2)(4/3)(3.14)(23^3) = 5,572.33 cubic units
C) (1/2)(4/3)(3.14)(43^3) = 8,359.23 cubic units
Therefore, the closest answer to the calculated volume is option N, 2,786.33 cubic units.
Since the problem does not provide the radius of the bowl, we cannot calculate the exact volume.
Given the multiple-choice options and using the value of π as 3.14, we can calculate the volume for each option:
A) (1/2)(4/3)(3.14)(23^3) = 5,572.33 cubic units
B) (1/2)(4/3)(3.14)(23^3) = 5,572.33 cubic units
C) (1/2)(4/3)(3.14)(43^3) = 8,359.23 cubic units
Therefore, the closest answer to the calculated volume is option N, 2,786.33 cubic units.
1 answer