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You multiply by 60 to have it in minutes. If you have another decimal part, you multiply it by 60 to have it in seconds.

Example:

If you have 10.33°, then it is the same as 10°19.8', who is the same by the way as 10°19'48''.

Q: How do you convert decimal degree to degree minutes seconds?

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Some scientific caculators can convert degrees minutes and seconds into decimal degrees and vice versa as for example 60045'18'' = 60.755

60 minutes in a degree. 38/60 = 0.63333 repeating 22.63 degrees

Take the percentage and make it a decimal (100% = 1, 34% = .34, etc.) Take the decimal and multiply it by 360 The resulting number is the degrees of a circle. Hope this helps!

you change the percent to a decimal and then multiply it by 360

It is already rounded to exactly that degree.

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Some scientific caculators can convert degrees minutes and seconds into decimal degrees and vice versa as for example 60045'18'' = 60.755

Each degree is equal to 60 minutes, each minute is equal to 60 seconds; to convert seconds to minutes, divide the seconds by 60 and add to the minutes. Ex. (Assume the asterisk (*) is a degree sign) 51* 43' 20" 51* + 43' + (20/60)' 51* + 43' + (1/3)' Answer: 51* 43 (1/3)' Hopefully this is answering the question you had. If you want to convert Minutes and seconds into decimal degrees, use either formula below: ((Seconds/60) + Minutes)/60 + Degrees or Degrees + (Minutes/60) + (seconds/3600)

DMS button on calculator

60 minutes in a degree. 38/60 = 0.63333 repeating 22.63 degrees

Works on the same principle as "60 seconds = 1 minute and 60 minutes = 1 hour (or degree in this case)... So for example: 2 degrees, 45 Minutes and 20 seconds is worked as follows: Now, 20 seconds = 0.33 minutes (i.e. 20/60); add to 45 minutes to get 45.33 minutes.. 45.33 minutes = 45.33/60 degrees = 0.7555 degrees. Therefore, final answer is 2 + 0.7555 = 2.7555 degrees.... Hope this helps!!

It's a method of measuring angles other than the more mainstream, simpler format. First you write the degree with the degree symbol, then you write the amount of minutes, which are 1/60 of a degree, and finally you write the seconds, which are 1/60 of minutes and therefore 1/3600 of a degree. It can be tricky to convert, but you should be able to do it back and forth with a graphing calculator.

There are 60 minutes in a degree and 60 seconds in a minute, so a degree has 3600 seconds. These are arc minutes and seconds, no relation to time measurements. A circle has 360 degrees.

The latitude and longitude are input in degrees, so you might need to convert to degrees from degrees:minutes:seconds. There are 60 seconds in 1 minute and 60 minutes in 1 degree. So, for example: 65:45:36 south latitude converts to -(65 degrees + (45 minutes * (1 degree/60 minutes)) + (36 seconds * (1 minute/60 seconds) * (1 degree/60 minutes))) = -65.76 degrees latitude

It's a method of measuring angles other than the more mainstream, simpler format. First you write the degree with the degree symbol, then you write the amount of minutes, which are 1/60 of a degree, and finally you write the seconds, which are 1/60 of minutes and therefore 1/3600 of a degree. It can be tricky to convert, but you should be able to do it back and forth with a graphing calculator.

12 degrees. There are 60 mins in a degree, so 0.65*60 is 39 mins 12 degrees, 39 minutes.

There are sixty minutes in a degree - so to convert degrees to minutes, you multiply by 60 !

The division of latitude and longitude degrees into "minutes" (1/60 degree) and "seconds" (1/60 minute or 1/3600 degree) was a non-decimal attempt to further refine positions. The variations are expressed as minutes and seconds of arc on the Earth's 360° sphere. At the equator, one minute is approximately one nautical mile. The use of minutes and seconds has given way to decimal degrees, which are more easily compared and calculated. Example : 1° 15' of latitude can be expressed as 1.25 ° (decimal for 15/60).