The latitude and longitude of a point in the Northern Hemisphere are related to spherical coordinates , , as follows. We take the origin to be the center of the earth and the positive -axis to pass through the North Pole. The positive -axis passes through the point where the prime meridian (the meridian through Greenwich, England) intersects the equator. Then the latitude of is and the longitude is . Find the great-circle distance from Los Angeles (lat. N, long. W) to Montréal (lat. N, long. W). Take the radius of the earth to be 3960 mi. (A great circle is the circle of intersection of a sphere and a plane through the center of the sphere.)
The latitude and longitude of a point in the Northern Hemisphere are related to spherical coordinates , , as follows. We take the origin to be the center of the earth and the positive -axis to pass through the North Pole. The positive -axis passes through the point where the prime meridian (the meridian through Greenwich, England) intersects the equator. Then the latitude of is and the longitude is . Find the great-circle distance from Los Angeles (lat. N, long. W) to Montréal (lat. N, long. W). Take the radius of the earth to be 3960 mi. (A great circle is the circle of intersection of a sphere and a plane through the center of the sphere.)
Elementary Geometry for College Students
6th Edition
ISBN:9781285195698
Author:Daniel C. Alexander, Geralyn M. Koeberlein
Publisher:Daniel C. Alexander, Geralyn M. Koeberlein
Chapter10: Analytic Geometry
Section10.CT: Test
Problem 1CT
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The latitude and longitude of a point in the Northern Hemisphere are related to spherical coordinates , , as follows. We take the origin to be the center of the earth and the positive -axis to pass through the North Pole. The positive -axis passes through the point where the prime meridian (the meridian through Greenwich, England) intersects the equator. Then the latitude of is and the longitude is . Find the great-circle distance from Los Angeles (lat. N, long. W) to Montréal (lat. N, long. W). Take the radius of the earth to be 3960 mi. (A great circle is the circle of intersection of a sphere and a plane through the center of the sphere.)
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