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This question is ambiguous. If you have an original side, and you know the terminal (final) side, and you know the terminal angle (between the two sides), then there's really not that much more. For rectangular coordinates (x and y) of offsets, use sines and cosines.
Vertical offset is (terminal sidelength)*sin(DEGREE MEASURE)
Horizontal offeset is (terminal sidelength)*cos(DEGREE MEASURE)
What else can I help you with?
How do you calculate the length of an arc of a circle?
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)
How do you find the arc length formed by a central angle x?
The arc length is equal to the angle times the radius. This assumes the angle is expressed in radians; if it isn't, convert it to radians first, or incorporate the conversion (usually from degrees to radians) in to your formula.
Convert degrees to meters?
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.
How many meters are there in 24 degrees?
It doesn't make sense to convert between units of length, and units of temperature (or angle, whichever you mean). In the case of an angle, the farther away you are from the center, in a rotational movement, the greater is the distance. The calculation is especially simple in radians: distance (along the circumference) = radius x angle. If your angle is in degrees, convert to radians first.
In a 130 inch diameter circle what is the length of the arc intercepted by a central angle of 115 degrees?
Length of arc: 115/360 times (130pi) = 130.5 inches rounded
How do you find the angle with the radius and the arc length?
The arc length divided by the radius is the angle in radians. To convert radians to degrees, multiply by (180/pi).
How do you calculate the length of an arc of a circle?
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)
How do you find the arc length formed by a central angle x?
The arc length is equal to the angle times the radius. This assumes the angle is expressed in radians; if it isn't, convert it to radians first, or incorporate the conversion (usually from degrees to radians) in to your formula.
What is the length of BC in this triangle angle BAC equals 40 degrees and angle ABC equals 50 degrees and angle BCA equals 90 degrees .?
In order to find length BC the length of AC or length of the hypotenuse must be given
How does one calculate arc length when given the radius and angle measure in degrees?
To find the arc length given the radius and angle measure in degrees, you must first convert the angle from degrees to radians, using the formula: Degrees = Radians X (pi/180). Then take the radians and the radius that you are given, and put them into the formula of Q = (a/r) where Q is the angle in radians, a is the arc length, and r is the radius. When you have this, simple multiply both sides by the radius to isolate the a. Once you do this, you have your answer.
How do you find the length of an arc in a circle?
You can measure it with a string. If you want to calculate it based on other measurements, you can multiply the radius times the angle, assuming the angle is in radians. If the angle is in degrees, convert it to radians first.
Convert degrees to meters?
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.
How many meters are there in 24 degrees?
It doesn't make sense to convert between units of length, and units of temperature (or angle, whichever you mean). In the case of an angle, the farther away you are from the center, in a rotational movement, the greater is the distance. The calculation is especially simple in radians: distance (along the circumference) = radius x angle. If your angle is in degrees, convert to radians first.
How do you convert degrees to meters?
it is possible!!Degrees, Minutes and Seconds to Distance A degree of longitude at the equator is 111.2 kilometers. A minute is 1853 meters. A second is 30.9 meters. For other latitudes multiply by cos(lat). Distances for degrees, minutes and seconds in latitude are very similar and differ very slightly with latitude. (Before satellites, observing those differences was a principal method for determining the exact shape of the earth.)for more details, fallow this link i found!http://www.uwgb.edu/dutchs/UsefulData/UTMFormulas.htm#Spreadsheet
In a 130 inch diameter circle what is the length of the arc intercepted by a central angle of 115 degrees?
Length of arc: 115/360 times (130pi) = 130.5 inches rounded
A central angle of a circle of radius 30 cm intercepts an arc of 6 cm Express the central angle in radians and in degrees?
A central angle is measured by its intercepted arc. Let's denote the length of the intercepted arc with s, and the length of the radius r. So, s = 6 cm and r = 30 cm. When a central angle intercepts an arc whose length measure equals the length measure of the radius of the circle, this central angle has a measure 1 radian. To find the angle in our problem we use the following relationship: measure of an angle in radians = (length of the intercepted arc)/(length of the radius) measure of our angle = s/r = 6/30 = 1/5 radians. Now, we need to convert this measure angle in radians to degrees. Since pi radians = 180 degrees, then 1 radians = 180/pi degrees, so: 1/5 radians = (1/5)(180/pi) degrees = 36/pi degrees, or approximate to 11.5 degrees.
How would you convert an angle in degrees to angle in radians?
Divide the angle measured in degrees by (180/pi). Alternatively, multiply by (pi/180).
