Find the distance along an arc on the surface of the earth that subtends a central angle of 1 minutes (1 minute = 1/60 degree). The radius of the earth is 3960 miles. Round to t…

Question

asked Jul 5, 2021 105k views

1 Answer

Dcorking · Answer 1 · 2021-07-11T05:54:32+0000

Answer:

1.152 miles

Step-by-step explanation:

Given: central angle = 1 minute =
((1)/(60)) ^(o)

radius of the earth = 3960 miles

The length of an arc =
$(\alpha )/(360^(o) )$ 2
$\pi$ r

where:
$\alpha$ is the central angle, and r is the radius.

Thus,

Distance along the arc =
$(\alpha )/(360^(o) )$ 2
$\pi$ r

Distance along the arc =
(((1)/(60)) ^(o) )/(360^(o) ) x 2 x
(22)/(7) x 3960

=
(((1)/(60)) ^(o) )/(360^(o) ) x 24891.4286

= 1.1524

The required distance along an arc is 1.152 miles.