answersLogoWhite

0


Best Answer

1 minute is 1/60 degrees and 1 second is 1/60 minutes

User Avatar

Wiki User

13y ago
This answer is:
User Avatar

Add your answer:

Earn +20 pts
Q: How do you determine minutes and seconds in world map if the degree is given?
Write your answer...
Submit
Still have questions?
magnify glass
imp
Continue Learning about Math & Arithmetic

What do the two dashes mean when your working out the angles of triangles?

If I understand the question correctly, you are referring to angles whose measures are given in the form: 40â—¦ 15' 25"If myunderstanding is correct, then the one dash (') refers to minutes and two dashes (") refer to seconds. There are 60 seconds in a minute and 60 minutes in a degree so that 1" is 1/3600 of a degree.


How any seconds are on the stopwatch showing one hour three minuets and five seconds?

There are 60 minutes in an hour. Thus to convert from hours to minutes you need to multiply by 60. In this case we have one hour so that becomes 60, add the 3 given in the question and we have 63 minutes. The next step is to multiply this by 60 to convert into seconds. 63 x 60 = 3780. Add this on to the five seconds given in the question and we have a final answer of 3,785.


How many seconds are in 21 hours?

Solve this problem by doing dimensional analysis. Start with your given (the number you are given): 21 hours Next, obtain some conversion ratios/factors. There are 60 minutes in 1 hour. There also 60 seconds in 1 minute. 21 hours x 60 minutes/1 hour x 60 seconds/1 minute Multiply and divide it out to get 75600 seconds.


How do you determine the degrees of a given polynomial?

The degree of a polynomial is the highest power that appears in the polynomial. For more than one variable, you must add the powers for each variable, for example, a3b2 is of degree 3 + 2 = 5.


The probability of a phone being answered at 2 min given the average time is 3?

The probability of a phone being answered in 2 minutes, given that the average time is 3 minutes, is not specified in the information given. More details or specific probabilities are needed to determine the answer.

Related questions

How many minutes is 3030 seconds?

There are 50.5 minutes in 3030 seconds. To find how many minutes are in a given number of seconds, divide the given number by the amount of seconds in one minute.


What are the three units of measure in which latitude and longitude are given?

The three units of measure in which latitude and longitude are given are: degrees (°), minutes ('), and seconds ('').


What do the two dashes mean when your working out the angles of triangles?

If I understand the question correctly, you are referring to angles whose measures are given in the form: 40â—¦ 15' 25"If myunderstanding is correct, then the one dash (') refers to minutes and two dashes (") refer to seconds. There are 60 seconds in a minute and 60 minutes in a degree so that 1" is 1/3600 of a degree.


How many millisecond in 30 minutes?

30 x 60 = 1800 seconds x 1000 (milli) = 1,800,000 milliseconds


What are minutes in geography?

Earth location points are given in Degrees Longitude and Degrees Latitude Traditionally they are expressed in Degrees, minutes, seconds, 1 degree = 60 minutes 1 minute = 60 seconds > Conversion Example: 15 Degrees 25 minutes = 15 + 25/60 degrees = 15.4167 degrees (decimal) 15 degrees 25 minutes 10 seconds = 15 + 25/60 + 10/3600 degrees = 15.4194 degrees (decimal)


Where Is 40 Degrees 23feet North And 3 Degrees 43feet West?

Geographic coordinates are given in degrees, minutes, and seconds, or in degrees and thousandths of a degree. They are not given in degrees and feet. As near as can be determined, substituting minutes for feet, this location is a field northwest of Mirador de Baztan in Spain


There are 360 degrees of longitude around the earth with each degree divided into 60 minutes and each minute is further divided into 60 seconds. What does this mean?

The "meaning" of this assignment of degrees, minutes and seconds is that it is a form of notation. We can accurately locate things by using a specified measurement, and a given reference, and in this case it's the Greenwich Mean.


Why do cartographers break down degrees of longitude and latitude into minutes and seconds?

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).


Why are minutes and seconds necessary in addition to degrees?

Because the difference of a full degree in either latitude or longitude can mean the difference of almost 70 miles (112 km) in location. If latitude and longitude are to be used to describe the location of a point to within a fraction of an inch (millimeter), then the coordinates must be given in small fractions of a degree. So either decimal degrees are used ... typically with five or six decimal places ... or else minutes and seconds are used to subdivide the degree ... 1 minute is 1/60th of a degree, and 1 second is 1/3600th of a degree.


How many seconds cooling time to be given aluminium gravity die costings?

3600 seconds or 60 minutes or 1 hour


How do you find frequency of motion in Hz?

Count its' complete 360 degree cycles. (That will take skill and maybe some electronics.) From a given point back to that point again. Divide that into time. Seconds for Hertz. Minutes for RPM.


How any seconds are on the stopwatch showing one hour three minuets and five seconds?

There are 60 minutes in an hour. Thus to convert from hours to minutes you need to multiply by 60. In this case we have one hour so that becomes 60, add the 3 given in the question and we have 63 minutes. The next step is to multiply this by 60 to convert into seconds. 63 x 60 = 3780. Add this on to the five seconds given in the question and we have a final answer of 3,785.