Respuesta :
Answer:
Amie should have multiplied 54 by 2/3
Step-by-step explanation:
The formula of the volume of a sphere is given by
[tex] \frac{4}{3}\pi r^3[/tex], where r is the radius of the sphere.
to find the volume of the sphere, we must find [tex]r^3[/tex]
We know that the formula of a cylinder of height h and radius r is given by
[tex]\pi r^2h[/tex]
So [tex] 54 = \pi r^2 h[/tex]
We know that the sphere and the cylinder have the same height. Recall that the height of the sphere of radius r, is the diameter of a circle that passes through the heighest and lowest points of the sphere. Then, h=2r. This means that
[tex]54 = 2\pi r^3[/tex]
From here, we know that [tex]\pi r^3 = \frac{54}{2}[/tex].
So the volume of the sphere is [tex] \frac{4}{3}\frac{54}{2} = \frac{2}{3}\cdot54[/tex].
So Amie should have multiplied 54 by 2/3.
Answer:
the answer is Amie should have multiplied 54 by two thirds i.e Amie should have multiplied 54 by 2/3.
Step-by-step explanation:
We find the formula for the Volume of the Sphere and Cylinder.
a. Volume the Sphere = 4/3 π r³........Equation 1
b. Volume the Cylinder = π r² h........Equation 2
We would find the ratio of the Volume of the Sphere to the Volume of the Cylinder .
= Volume of the Sphere : Volume of the Cylinder
= 4/3 π r³ : π r² h.........Equation 3
Divide both sides by π r²
= 4/3 r : h.............Equation 4
It is important to note that the height of the sphere = the diameter of the sphere .
The diameter of a Sphere (D) = 2r
In the question, remember we were told that the height of the Sphere is the same as the height of the Cylinder.
i.e Height of the Sphere = Height of the Cylinder
Hence, the height of the Cylinder is also = 2r
Step 3
We would be substituting 2r for the Height of the Cylinder represented as h in Equation 4
Therefore, the ratio will be given as :
= 4/3 r : 2r ..............Equation 5
We would divide both sides by 2r
= 2/3 : 1 ..............Equation 6
From Equation 6 we can see that the volume of the sphere = 2/3 the volume of the cylinder
In the question above, we were told the volume of the cylinder = 54 m³
Hence, the volume of the sphere = 2/3 × 54 = 36 m³
Therefore, the answer is Amie should have multiplied 54 by two thirds i.e Amie should have multiplied 54 by 2/3.
