time to arc
multiply by 15 the degree to find the number of hours
divide by 4 to get the munite
divide by 15 to get tne seconds
Chat with our AI personalities
Converting degrees to meters involves understanding the relationship between angles and arc length on a circle. Since one degree is equal to 1/360th of a full circle, you can use this ratio to convert degrees to radians by multiplying the degree measure by π/180. To convert radians to meters, you would need to know the radius of the circle. The formula to convert radians to arc length is arc length = radius x angle in radians.
there are 60 seconds in one minute. An arc minute is 1/60 degree and an arc second is 1/3600 degree
The length of the arc is equal to the radius times the angle (angle in radians). If the angle is in any other measure, convert to radians first. (radians = degrees * pi / 180)
First , focus on this. We know 1 Day = 24 Hours = 360 Degree Then 15 Degree = 1 hour 1 degree = 4 Minutes 15' = 1 Minute and 1' = 4 Seconds. So, we can say that arc to time is, the time gap or interval maintains arc during making an arc connected.
I assume you mean you have a latitude of d degrees, m minutes and s seconds that you want as a decimal number. The minutes and seconds are just like time: 1 minute (of arc) = 60 seconds (of arc) 1 degree (of arc) = 60 minutes (of arc) = 60 × 60 seconds (of arc) = 3600 seconds (of arc) → to convert d° m' s" to decimal add: d + m/60 + s/3600 Degrees latitude North are positive, whereas South are negative. eg 52° 6' 15" N is 52 + 6/60 + 15/3600 = 52 + 0.1 + 0.0041666... = 52.1041666...° ≈ 52.1042° eg 47° 12' 40" S is -(47 + 12/60 + 40/3600) = -(47 + 0.2 + 0.0111...) = -47.2111...° ≈ -47.2111°