find two different combinations of radius and height that produce two cylinders with nearly the same volume. Record the dimensions and volumes of the two cylinders below.

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berno berno · Answer 1 · 2020-05-04T23:22:24+02:00

Answer:

For [tex]C_1[/tex], r = 2 units and h = 1 unit

For [tex]C_2[/tex], r = 1 unit and h = 4 units

Step-by-step explanation:

Given: cylinders

To find: two different combinations of radius and height that produce two cylinders with nearly the same volume

Solution:

Let [tex]C_1,C_2[/tex] represents two cylinders.

For cylinder [tex]C_1[/tex]:

Radius (r) = 2 units

Height (h) = 1 unit

Volume of cylinder = [tex]\pi r^2 h=\pi (2)^2(1)=4 \pi[/tex] cubic units

For cylinder [tex]C_2[/tex]:

Radius (r) = 1 unit

Height (h) = 4 units

Volume of cylinder = [tex]\pi r^2 h=\pi (1)^2(4)=4 \pi[/tex] cubic units

Therefore,

cylinders [tex]C_1,C_2[/tex] have same volume.

destenysoriano3 destenysoriano3 · Answer 2 · 2020-08-12T23:35:12+02:00

Answer:

ANSWER option 1:

cylinder 1 r=12 and h=6 v= 864

cylinder r=6 and h=24 v= 864

ANSWER option 2:

These radius and height values will produce the same volume:

radius = 6 units and height = 18 units

radius = 9 units and height = 8 units

Step-by-step explanation:

(Both options above are correct)

1st option I got that answer right on edmentum

2nd option is the sample answer given on edmentum