Convert Arc second to Gradian
Simple, fast and user-friendly online tool to convert Arc second to Gradian ( arcsec to grad ) vice-versa and other Angle related units. Learn and share how to convert Arc second to Gradian ( arcsec to grad ). Click to expand short unit definition.Arc second (arcsec) | = | Gradian (grad) |
Arcsecond Conversion Table | ||
---|---|---|
Arc second(arcsec) to Degree (°) td > | = | 1 Degree (°) Degree|° |
Arc second(arcsec) to Radian (rad) td > | = | 1 Radian (rad) Radian|rad |
Arc second(arcsec) to Milliradian (mrad) td > | = | 1 Milliradian (mrad) Milliradian|mrad |
Arc second(arcsec) to Microradian (Μrad) td > | = | 1 Microradian (Μrad) Microradian|Μrad |
Arc second(arcsec) to Gradian (grad) td > | = | 1 Gradian (grad) Gradian|grad |
Arc second(arcsec) to Revolution (rev) td > | = | 1 Revolution (rev) Revolution|rev |
Arc second(arcsec) to Arc minute (arcmin) td > | = | 1 Arc minute (arcmin) Arcminute|arcmin |
Arc second(arcsec) to Arc second (arcsec) td > | = | 1 Arc second (arcsec) Arcsecond|arcsec |
Arc second(arcsec) to Milliarcsecond (mas) td > | = | 1 Milliarcsecond (mas) Milliarcsecond|mas |
Arc second(arcsec) to Microarcsecond (μas) td > | = | 1 Microarcsecond (μas) Microarcsecond|μas |
An Arcsecond (also written as arc second or abbreviated as ″) is a very small unit of angle measurement used in fields like astronomy, navigation, and geodesy (the study of Earth's shape). It helps measure extremely tiny angles, especially when observing distant objects like stars or when needing high precision in mapping.
Understanding an ArcsecondTo understand what an arcsecond is, we need to start with the concept of a degree:
- A degree (°) is a way of measuring angles, where a full circle is 360 degrees.
- Each degree is further divided into 60 minutes (not to be confused with time minutes). These are called arcminutes.
- Each arcminute is then divided into 60 arcseconds.
So, an arcsecond is 1/60th of an arcminute and 1/3600th of a degree.
Key Facts About Arcseconds- Tiny Angle:
- Since an arcsecond is such a small angle, it's used for very precise measurements. For instance, 1 arcsecond is equal to 1/3600th of a degree.
- Relation to Degrees:
- 1 arcsecond = 1/3600th of a degree.
- 1 arcminute = 60 arcseconds.
- Practical Uses:
- Astronomy: Astronomers use arcseconds to measure the positions and sizes of stars, planets, and other celestial objects in the sky. For example, the apparent size of a distant star might be just a few arcseconds across.
- Geodesy: When mapping the Earth, precise locations might be given in degrees, minutes, and seconds to ensure accuracy.
Visualizing an arcsecond can be challenging because it’s so small. Here's a way to think about it:
- Imagine you’re looking at a clock face from a distance of 1 kilometer (0.6 miles). The angle that the width of a coin held at arm’s length would cover from that distance is roughly 1 arcsecond.
Another way to understand it:
- If you divided a full circle (360°) into 1.3 million equal parts, each part would be about 1 arcsecond.
In astronomy, if you were observing the sky, the distance between two stars that are very close together might be just a few arcseconds. If a telescope can resolve details down to 1 arcsecond, it can distinguish two stars that are this close to each other.
Summary- An arcsecond is a very small unit of angle measurement, equal to 1/3600th of a degree.
- It’s used in fields requiring precise angular measurements, like astronomy and geodesy.
- There are 60 arcseconds in an arcminute and 3600 arcseconds in a degree.
- Arcseconds help measure extremely tiny angles, making them essential for observing distant objects or mapping locations with high precision.
Understanding arcseconds is crucial for working in fields that involve very precise measurements of angles, especially when dealing with objects that are far away or when exact positioning is needed.
What is Gradian ?
A Gradian (also known as gon or grade) is a unit of angle measurement used in some fields like surveying, engineering, and cartography. It’s an alternative to degrees and radians for measuring angles, with a focus on dividing angles into even parts for easier calculation.
Understanding a GradianA gradian is defined by dividing a full circle into 400 equal parts. Each of these parts is one gradian. This means:
- A full circle equals 400 gradians.
- A right angle (which is one-quarter of a circle) is 100 gradians.
Relation to Degrees and Radians:
- 1 gradian is equal to 0.9 degrees.
- 1 gradian is also approximately equal to 0.0157 radians.
- Since a full circle is 360 degrees, and a full circle is 400 gradians, 1 degree equals 10/9 gradians (or approximately 1.111 gradians).
- Similarly, 1 radian is about 63.66 gradians.
Common Gradian Values:
- 0 grad: Starting point, like 0° or 0 radians.
- 100 grad: Equivalent to 90° or π/2 radians (a right angle).
- 200 grad: Equivalent to 180° or π radians (a straight angle).
- 300 grad: Equivalent to 270° or 3π/2 radians.
- 400 grad: Equivalent to 360° or 2π radians (a full circle).
Gradians are particularly useful in applications where angles are frequently divided into quarters or decimals. For example:
- Surveying: When surveyors measure land or set out construction projects, using gradians allows for simpler calculations when dealing with right angles or dividing an area into equal parts.
- Engineering: Gradians can simplify the calculations involving angles that are multiples of 10, which are common in engineering designs.
Imagine a circle divided into four equal parts:
- In degrees, each part is 90°.
- In gradians, each part is 100 grad. This division makes it straightforward to work with right angles, which are common in many practical applications.
If an engineer needs to design a road that turns exactly 45 degrees, they can quickly convert this to 50 gradians (since 45° is half of 90°, and half of 100 grad is 50 grad). This ease of division is one of the reasons gradians are sometimes preferred in technical fields.
Summary- A gradian is a unit of angle measurement where a full circle is divided into 400 equal parts.
- 1 gradian equals 0.9 degrees or approximately 0.0157 radians.
- Gradians are especially useful in fields like surveying and engineering, where angles often need to be divided into even parts.
- 100 gradians make a right angle, and 400 gradians make a full circle.
Understanding gradians can be beneficial in certain technical fields where simplicity and ease of calculation are important, especially when working with angles that are frequently divided into equal parts.
List of Angle conversion units
Degree Radian Milliradian Microradian Gradian Revolution Arc minute Arc second Milliarcsecond Microarcsecond