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Home My WebLink About024650.00 feet to a point; t~ence North G2 degrees Oa minutes 29 seconds East a distance of 200.00 feet to a point; thence South 2? degrees 5S minutes 31 seconds East a distance of 5S.24 feet to the point of curvature of a curve concave to the northeast with a radius of 100.OD feet and central angle of 61 degrees 50 minutes 51 seconds; thence southeasterly along the arc of said curve a distance of 107.94 feet to the point of tangency; thence Soutn 89 degrees 46 minutes 22 geconds ~ast a distance of 889.73 feet to a point; thence North 00 degrees 08 minutes 33 seconds East a distance of 723•46 feet to the point of curvature of a curve concave to the northwest With a radius of 75.00 feet and a central angle of 90 degrees 00 minutes 00 seconds; thence southwesterly along the arc of said curve a distance of 117.81 feet to the point of tangency; thence North 89 degrees 51 minutes 27 seconds West a distance of 12.14 feet to a point; thence South 62 degrees 04 minutes 29 seconds West a distance of 33•50 feet to a point; thence North 27 degrees 55 minutes 31 seconds West a distance of 182.00 feet to a point; thence North 02 degrees 04 minutes 29 seconds East a distance of 40.00 feet to a point; thence North 27 degrees 55 minutes 31 seconds West a distance of 580.00 feet to a point; thence South 62 degrees 04 minutes 29 seconds West a distance of 156.00 feet to a point; thence North 00 degrees 08 minutes 33 seconds East a distanee of 49u.49 feet to the point of curvature of a curve concave to the southeast With a radius of 75.00 feet and a central angle of 90 degrees 00 minutes 00 seconds; thence northeasterly along the arc of said curve a distance of 117.81 feet to the point of tangency (said point being located on the southern right-of-way line of Walton Road); thence North 89 degrees 51 minutes 27 seconds West, along the southern right-of-way line of Walton Road, a distance of 204.00 feet to the point of curvature of a curve concave to the~ southwest with a radius of 75.00 feet•and a central angle of ' 90 degrees 00 minutes 00 seconds; thence, leaving the southern right-of-way line of Walton Road, southeasterly along the arc of said curve a distance of 117.81 feet to ~he point of tangency; thence South QO degrees 08 minutes 33 seconds West a distance oY 29$.00 feet to a point; thence North 89 degrees 51 minutes 27 seconds West a distance of ?56.00 feet to a point; thence South 62 degrees 04 minutes 29 seconds West a distance of 195.71 feet to a point; thence North 27 degrees 55 minutes 31 seconds West a distance of 273.86 feet to the point of curvature of a curve concave to the southeast with a radius of 75.00 f'ee~ and a central angle of 90 degrees 00 ~inutes 00 seconds; thence northeasterly along the arc of said curve a distance of 117.81 feet to the point of tangency (said point being located on the southeastern right-of-way line of Walton Road); thence South 62 degrees 04 minutes 29 seconds West, along the southeastern right-of-way line of Walton Road, a distance of 198.00 feet to the point of ~urvature of a curve concave to tne southWest with a radius of 75.00 feet and a central angle of 90 degrees 00 minutes 00 seconds;_thence, leaving the soutneastern right-of-way line of Walton Road, southeasterly along the arc of said curve a distance of 117.81 feet to the point of tangency; thence South 27 degrees 55 minutes 31 seconds East a distance of 510.00 feet to a point; thence Soutn 62 degrees 04 minutes 29 seconds West a distance of 220.00 feet to a point; thence South 27 degrees 55 minutes 31 seconds East a distance of 873.00 feet to a point; thsnce North 62 degrees 04 mi~utes 29 seconds East a distance of 228.00 feet to a point; thence North 27 degrees ~5 minutes 31 seconds West a distance of 175.00 feet to a point; thence North 62 degrees 04 minutes 29 seconds East a distance of 42b.01 feet to a point; thence South ?2 degrees 55 minutes 31 seconds East a distance of 45.00 feet to a point; thence South 27 degrees 55 minutes 31 seconds East a distance of 244.8fl feet to a point; thence North 62 degrees Ou minutes 29 seconds East a distance of 17.67 feet to a peint; thence South 27 degrees 55 minutes 31 seconds East a distance of 437.48 feet to a point; thence South b2 degrees 04 minutes 29 seconds West a distance of 180.00 feet to the point of curvature of a curve concave to the north with a radius of 137.69 feet and a central angle of 28 degrees 09 minutes 09 seconds; thence westerly along the arc of said curve a distance of b7.65 feet to the point of tangency; thence North 89 degrees 46 minutes 22 seconds West a EXHIBIT "A" - Page 2 ~ ~,R F,~~K•3~8 F~GE 246 : 4 ~ ~~ ..t?- +..v'.. ~_ . . .-. ... .. . - - - ~ _ -~. ..._-v . ,~