Sinusoidal projection

The sinusoidal projection is a pseudocylindrical equal-area map projection, sometimes called the Sanson–Flamsteed or the Mercator equal-area projection. Jean Cossin of Dieppe was one of the first mapmakers to use the sinusoidal, appearing in a world map of 1570. The projection is defined by:

${\displaystyle x=\left(\lambda -\lambda _{0}\right)\cos \varphi }$

${\displaystyle y=\varphi \,}$

where φ is the latitude, λ is the longitude, and λ₀ is the central meridian.^[1]

The north-south scale is the same throughout the central meridian, and the east-west scale is identical throughout the map. So, on the map, as in reality, the length of each parallel is proportional to the cosine of the latitude, and the shape of the map for the whole earth is the area between two symmetric rotated cosine curves.

All the other meridians (lines of longtitude) are shown on the map as longer than the central meridian (while in reality they are the same length). To obtain the distance between two points on a meridian, you can use the vertical distance between the parallels that intersect the meridian at those points.

There is no distortion at all along the central meridian or along the equator. Distances along those lines as well as angles of intersection with those lines are accurately measured, and distortion is low throughout the region close to those lines.

Similar projections which wrap the east and west parts of the sinusoidal projection around the north pole are the Werner and the intermediate Bonne and Bottomley projections.

The MODLAND Integerized Sinusoidal Grid, based on the sinusoidal projection, is a geodesic grid developed by the NASA's Moderate-Resolution Imaging Spectroradiometer (MODIS) science team.^[2]

• Cybergeo article
• Table of examples and properties of all common projections, from radicalcartography.net