Trigonometry 6 - Ambiguous Case
... 1. There is ______ triangle that satisfies the conditions. 2. There are ______ triangles that satisfy the conditions. 3. There are ______ triangles that satisfy the conditions. When the given angle is obtuse: If the given angle ( A ) is obtuse, there are two possible cases: Case 1: a b ...
... 1. There is ______ triangle that satisfies the conditions. 2. There are ______ triangles that satisfy the conditions. 3. There are ______ triangles that satisfy the conditions. When the given angle is obtuse: If the given angle ( A ) is obtuse, there are two possible cases: Case 1: a b ...
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... 1) a. The shortest path between Anchorage and Saint Petersburg is calculated in 1b, which is if you head directly west on a great circle between these cities. This path was found to be 13343.391 kilometers. We can find the distance heading directly east by subtracting this from the circumference of ...
... 1) a. The shortest path between Anchorage and Saint Petersburg is calculated in 1b, which is if you head directly west on a great circle between these cities. This path was found to be 13343.391 kilometers. We can find the distance heading directly east by subtracting this from the circumference of ...
Notes Section 4-1
... sides of equal measure (no congruent sides) Isosceles triangles—triangles with at least TWO sides of equal measure (2 congruent sides) Equilateral Triangles—triangle with all sides exactly the same measure (all 3 sides congruent to each other) ...
... sides of equal measure (no congruent sides) Isosceles triangles—triangles with at least TWO sides of equal measure (2 congruent sides) Equilateral Triangles—triangle with all sides exactly the same measure (all 3 sides congruent to each other) ...
Apollonian network
In combinatorial mathematics, an Apollonian network is an undirected graph formed by a process of recursively subdividing a triangle into three smaller triangles. Apollonian networks may equivalently be defined as the planar 3-trees, the maximal planar chordal graphs, the uniquely 4-colorable planar graphs, and the graphs of stacked polytopes. They are named after Apollonius of Perga, who studied a related circle-packing construction.