Velocity made good
Encyclopedia
Velocity made good, or "vmg," is a term in sailing
, and specifically yacht racing
, that refers to the component of a sailboat's velocity that is in the direction of the next mark. The concept is useful in sailing, because a sailboat often cannot, or should not, sail directly to a mark to reach the mark as quickly as possible. Sailboats cannot sail directly upwind, and it is usually less than optimal, and sometimes dangerous, to sail directly downwind. Instead of sailing toward the mark, the helmsman chooses a point of sail
that optimizes velocity
made good.
Consider the scenario of a boat trying to sail directly north, with the wind coming also directly from the north. Because the boat cannot sail directly into the wind, the sailor must alternate between northeast and northwest headings, which are commonly called "tacks." On a northeast tack
, the sailor will generally point the sailboat as far north as it can go while still keeping the winds blowing through the sails in a manner that provides aerodynamic lift that propels the boat quickly through the water, then they will fall off to a certain degree to create more forward wind pressure on the sails and better balance of the boat, which allows it to move with greater speed
through the water, but with a less advantageous angle toward the mark.
A good sailor can intuitively strike the balance between speed and advantageous angle within a certain range of degrees, because the boat will either obviously slow down too much or get too far off course. To find the optimum angle with more precision, though, the sailor will want to determine the velocity made good, which usually requires computation and instrumentation.
Suppose that you are on a heading of 60 degrees NE, and the speed of the boat is 5 knots. By falling off to 65 degrees NE, you can speed up the boat to 5.2 knots. Is the extra speed worth the less direct progress toward the mark?
The answer requires basic trigonometry. In both cases you want to know the northward component of the velocity vector, which requires taking the cosine of the angle between north and the sailboat's heading.
cos(60) * 5 = 2.50 knots made north (vmg)
cos(65) * 5.2 = 2.20 knots made north (vmg)
In this case, the more upwind setting clearly makes more velocity made good toward the mark, despite the lesser speed.
There are several strategies for computing vmg in these cases.
Sailing
Sailing is the propulsion of a vehicle and the control of its movement with large foils called sails. By changing the rigging, rudder, and sometimes the keel or centre board, a sailor manages the force of the wind on the sails in order to move the boat relative to its surrounding medium and...
, and specifically yacht racing
Yacht racing
Yacht racing is the sport of competitive yachting.While sailing groups organize the most active and popular competitive yachting, other boating events are also held world-wide: speed motorboat racing; competitive canoeing, kayaking, and rowing; model yachting; and navigational contests Yacht racing...
, that refers to the component of a sailboat's velocity that is in the direction of the next mark. The concept is useful in sailing, because a sailboat often cannot, or should not, sail directly to a mark to reach the mark as quickly as possible. Sailboats cannot sail directly upwind, and it is usually less than optimal, and sometimes dangerous, to sail directly downwind. Instead of sailing toward the mark, the helmsman chooses a point of sail
Points of sail
Points of sail describes a sailing boat's course in relation to the wind direction.There is a distinction between the port tack and the starboard tack. If the wind is coming from anywhere on the port side, the boat is on port tack. Likewise if the wind is coming from the starboard side, the boat...
that optimizes velocity
Velocity
In physics, velocity is speed in a given direction. Speed describes only how fast an object is moving, whereas velocity gives both the speed and direction of the object's motion. To have a constant velocity, an object must have a constant speed and motion in a constant direction. Constant ...
made good.
Consider the scenario of a boat trying to sail directly north, with the wind coming also directly from the north. Because the boat cannot sail directly into the wind, the sailor must alternate between northeast and northwest headings, which are commonly called "tacks." On a northeast tack
Tack (sailing)
Tack is a term used in sailing that has different meanings in different contexts, variously a part of a sail, and an alignment with the wind. When using the latter sense, the maneuver of turning between starboard and port tack is either tacking or jibing....
, the sailor will generally point the sailboat as far north as it can go while still keeping the winds blowing through the sails in a manner that provides aerodynamic lift that propels the boat quickly through the water, then they will fall off to a certain degree to create more forward wind pressure on the sails and better balance of the boat, which allows it to move with greater speed
Speed
In kinematics, the speed of an object is the magnitude of its velocity ; it is thus a scalar quantity. The average speed of an object in an interval of time is the distance traveled by the object divided by the duration of the interval; the instantaneous speed is the limit of the average speed as...
through the water, but with a less advantageous angle toward the mark.
A good sailor can intuitively strike the balance between speed and advantageous angle within a certain range of degrees, because the boat will either obviously slow down too much or get too far off course. To find the optimum angle with more precision, though, the sailor will want to determine the velocity made good, which usually requires computation and instrumentation.
Suppose that you are on a heading of 60 degrees NE, and the speed of the boat is 5 knots. By falling off to 65 degrees NE, you can speed up the boat to 5.2 knots. Is the extra speed worth the less direct progress toward the mark?
The answer requires basic trigonometry. In both cases you want to know the northward component of the velocity vector, which requires taking the cosine of the angle between north and the sailboat's heading.
cos(60) * 5 = 2.50 knots made north (vmg)
cos(65) * 5.2 = 2.20 knots made north (vmg)
In this case, the more upwind setting clearly makes more velocity made good toward the mark, despite the lesser speed.
There are several strategies for computing vmg in these cases.
- You can compute vmg using the trigonometry shown above, with an ordinary scientific calculator.
- You can use special graph paper with radial lines at various headings, then draw two lines on the paper. First draw a line with desired heading, then draw a vector with the actual heading and actual speed, then find the projection of the vector onto the line in the desired heading.
- You can use a computer to pre-compute vmg for many boat speeds and angles off the wind, print them out in a chart format, laminate them, and then carry them on the boat.
- You can use special devices to compute the vmg.