Question

Given the angle below and a radius of 5 what is the arc length?
12pi/7

Answer 1

@darkknight

Answer 2

We need to see the "angle below"

Answer 3

thats what i tried to say in your last post

Answer 4

Angle (theta) times radius equals arc length

Answer 5

@HIDIK

Answer 6

The angel is 12 (pi) over 7

Answer 7

Oh, is 12pi/7 the angle?

Answer 8

yes

Answer 9

Okay, so it is 12pi/7 times the radius which is 5

Answer 10

[img]

Answer 11

\[\theta r = arc\]

Answer 12

Can you solve it now?

Answer 13

I am completely lost tbh

Answer 14

what part is confusing to you?

Answer 15

So to find the arc length, you have to multiply the corresponding angle with the radius

Answer 16

Thats all there is to it

Answer 17

\(\color{#0cbb34}{\text{Originally Posted by}}\) @darkknight
\[\theta r = arc\]
\(\color{#0cbb34}{\text{End of Quote}}\)
Is your formula

Answer 18

I am the darkknight.

Answer 19

lol he always says that after helping someone

Answer 20

this was not helpful at all

Answer 21

are you still stuck?

Answer 22

I never ask question so yes I am still stuck

Answer 23

What exactly are you confused on, @HIDIK ? He is showing you how to find the arc length, just as the question asks.

Answer 24

then what dont you understand?

Answer 25

uh oh. What do you not understand. If you don't get the formula that I am telling you to help solve the problem, then that means that your don't have a strong background. So Ill tell you. There is a corellation between the radius angle, and arc length. So if the arc length is S, then \

Answer 26

That did not post.

Answer 27

\

Answer 28

So the equation isn't working for some reason
What I was saying is that S = (theta)(r)

Answer 29

Please!!! work with me