How do I complete this problem on arc length? - QAmmunity.org

How do I complete this problem on arc length?

asked Dec 28, 2022 170k views

1 Answer

Answer:

a) Length of the arc:
$(25\pi )/(3)$
or ≈ 26.18

b) Area of the sector:
$(125\pi )/(6)$
m^2 or ≈ 65.45
m^2

c) 16
$\pi$ rad or 2880°

Explanation:

If a is the length of the arc, r is the radius of the sector and 0 the central angle in radians.

Use the formula:

[set r = 5 m, 0 =
$(5\pi )/(3)$ (given)]

a=0 ·

⇒
$a=(5\pi )/(3) .$

⇒
$a=(25\pi )/(3)$ ≈
26.18

The arc length of the watered sector is
$(25\pi )/(3)$
or ≈ 26.18.

----------------------------------------------------------------------------------------------

Recall, the area A of a circle (obviously
$0=2\pi$
rad ) with a radius
is given by the formula:

$A=\pi r^2=(2\pi )/(2) r^2$

So the area of the circular sector with radius r and central 0 (in radians) will be:

[set r = 5m , 0 =
$(5\pi )/(3)$ (given)]

Asector=(0)/(2) r^2

⇒
$Asector=(5\pi/3 )/(2) (5)^2$

⇒
Asector =
$(5\pi )/(6)(25)$

⇒
Asector =
$(125\pi )/(6)$ ≈ 65.45
m^2

The area of the watered sector is
$(125\pi )/(6)$
m^2 or ≈ 65.45
m^2 .

-----------------------------------------------------------------------------------------------

From the given information we know that the sprinkler perform a full revolution (2
$\pi$ rad) every 15 sec so we will make the following proportion:

(15 sec)/( 2 min) =
$(2\pi )/(0)$

⇒
(15 sec)/(120 sec) =
$(2\pi )/(0)$

⇒ 0 =
$(2\pi . 120 sec)/(15 sec)$

⇒ 0 =
$(240\pi )/(15)$

⇒ 0 =
$16\pi$

We can convert the angle of 0 =
$16\pi$ rad to degrees as shown:

0deg = 16
$\pi$ ×
$(180°)/(\pi )$

⇒
0deg = 2880°

Finally the sprinkler rotates 16
$\pi$ rad or 2880° in 2 minutes.

Potter answered Jan 3, 2023

by Potter

5.2k points

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