You are to draw two circles, centered at points C and D. Circle C is the smallest circle that is externally tangent to circles A and B, while Circle D is the smallest circle that is internally tangent to circles A and B. You would expect point C to be (closer to point A/closer to point B/equidistant from points A and B/of indeterminate location) while point D is (closer to point A/closer to point B/equidistant from points A and B/of indeterminate location) .
You are to draw two circles, centered at points C and D. Circle C is the smallest circle that is externally tangent to circles A and B, while Circle D is the smallest circle that is internally tangent to circles A and B. You would expect point C to be (closer to point A/closer to point B/equidistant from points A and B/of indeterminate location) while point D is (closer to point A/closer to point B/equidistant from points A and B/of indeterminate location) . Both points C and D are (collinear with point A only/collinear with B only/collinear with both points A and B/of indeterminate location) The point of intersection of the lines internally tangent to circles A and B is (closer to A/closer to B/equidistant from points A and B)
Trending now
This is a popular solution!
Step by step
Solved in 2 steps with 2 images
