Answer: Option C.
Step-by-step explanation:
Use the formula for calculate the volume of a cone:
[tex]V=\frac{1}{3}\pi r^2h[/tex]
Where r is the radius and h is the height.
Volume of the cone A:
[tex]V_A=\frac{1}{3}\pi (2in)^2(3in)=12.56in^3[/tex]
Volume of the cone B:
If the height of the cone B and the height of the cone A are the same , but the radius of the cone B is doubled, then its radius is:
[tex]r_B=2r_A\\r_B=2*2in\\r_B=4in[/tex]
Then:
[tex]V_B=\frac{1}{3}\pi (4in)^2(3in)=50.26in^3[/tex]
Divide [tex]V_B[/tex] by [tex]V_A[/tex]:
[tex]\frac{V_B}{V_A}=\frac{50.26in^3}{12.56in^3}=4[/tex]
Therefore: When the radius is doubled, the resulting volume is 4 times that of the original cone.
Answer:
C) When the radius is doubled, the resulting volume is 4 times that of the original cone
Step-by-step explanation:
Volume of a cone is given by:
[tex]Volume=\frac{1}{3} \pi r^{2}h[/tex]
Cone A has radius = r = 2 inches and height = h = 3 inches
So, the volume of cone A will be:
[tex]Volume=\frac{1}{3} \pi (2)^{2} \times 3 = 4 \pi[/tex]
Height of cone B is same as cone A, so height of cone B = h = 3 inches
Radius of cone B is double of cone A, so radius of cone B = r = 4 inches
So, the volume of cone B will be:
[tex]Volume=\frac{1}{3} \pi (4)^{2} \times 3 = 16 \pi[/tex]
From here we can see that volume of cone B is 4 times the volume of cone A. Thus, doubling the radius increases the volume to 4 times.
So, option C is correct. When the radius is doubled, the resulting volume is 4 times that of the original cone
