100 POINTS!!!!! Two cylinders are similar with diameters 6 in and 9 in. a. Find the ratio of the circumference of their bases b. Find the ratio of the surface areas. c. Find the ratio of the volumes. - QAmmunity.org

100 POINTS!!!!! Two cylinders are similar with diameters 6 in and 9 in. a. Find the ratio of the circumference of their bases b. Find the ratio of the surface areas. c. Find the ratio of the volumes.

Niall Byrne asked Apr 19, 2022

144,657 views

2 Answers

Answer:

a. Ratio of their circumference = 2:3

b. The ratio of their surface areas = 2:3

c. The ratio of their volume = 4:9

Explanation:

Let the cylinders be labelled as A and B respectively.

Diameter of cylinder A = 6 in,

its radius =
(diameter)/(2)

=
(6)/(2) = 3 in

Diameter of cylinder B = 9 in,

its radius =
(diameter)/(2)

=
(9)/(2) = 4.5 in

Thus,

a. circumference of a circle = 2
$\pi$ r

Circumference of cylinder A = 2
$\pi$ r

= 2 x
$\pi$ x 3

= 6
$\pi$ in

Circumference of cylinder B = 2
$\pi$ r

= 2 x
$\pi$ x 4.5

= 9
$\pi$

Ratio of their circumference =
(circumference of cylinder A)/(circumference of cylinder B)

=
$(6\pi )/(9\pi )$

= 2:3

b. The surface area of a cylinder = 2
$\pi$ rh

the surface area of cylinder A = 2
$\pi$ rh

= 6
$\pi$ h

the surface area of cylinder B = 2
$\pi$ rh

= 9
$\pi$ h

The ratio of their surface areas =
(surface area of cylinder A)/(surface area of cylinder B)

=
$(6\pi h)/(9\pi h)$

= 2:3

c. Volume of a cylinder =
$\pi$
r^(2) h

volume of cylinder A =
$\pi$
r^(2) h

=
$\pi$ x
3^(2) x h

= 9
$\pi$ h

volume of cylinder b =
$\pi$
r^(2) h

=
$\pi$ x
4.5^(2) x h

= 20.25
$\pi$ h

The ratio of their volume =
(volume of cylinder A)/(volume of cylinder B)

=
$(9\pi h)/(20.25\pi h)$

= 4:9

Scott Cranfill answered Apr 26, 2022

by Scott Cranfill

2.8k points

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