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Draw a radius circle around a location in Google Maps to show a distance from that point in all directions.
The standard equation of a circle with center (h, k) and radius = r is Match each graph with its equation. Give the radius and coordinates of the center of the circle with the given equation.
Given a circle with the center (5, 1) and a point on the circle (8, -2). Given a circle with the center at the origin and passing through (4, 3). Extension (Hint: find the coordinates of the center first)
Parts of a Circle Diagram. Radius - a straight line from the center of the circle to the edge. Diameter - a straight line from one side of the circle to the other, going through the center of the circle. Circumference - the outside of the whole circle (the perimeter of the circle).
Use the information provided to write the equation of each circle. 9) Center: (13 , −13) Radius: 4 10) Center: (−13 , −16) Point on Circle: (−10 , −16) 11) Ends of a diameter: (18 , −13) and (4, −3) 12) Center: (10 , −14) Tangent to x = 13 13) Center lies in the first quadrant Tangent to x = 8, y = 3, and x = 14 14) Center: (0, 13)
The standard equation of a circle with center (h, k) and radius = Match each graph with its equation. (3/0) 4 A. x2 + = 4 36 -2,3) Give the radius and coordinates of the center of the circle with the given equation.
Each circle picture shows a radius or diameter. Students must use this information to figure out the circumference. Students measure various circular objects and divide the circumference by the diameter to get pi. Students answer the short answer questions about circles, circumference, and pi.