1. SSA triangles are considered ambiguous because they can be solved different ways and there are different solutions.
2. We can't use the law of sines to solve the triangles because then you would only be solving one triangle. In SSA triangles there could be two, one, or no triangles so you have to take extra steps in order to solve them.
3. In this situation there are two triangles because the side opposite the given triangle is greater than the height and less than the other given side. Because is makes two triangles you would have to solve for two triangles so there would be two C angles, two c sides, and two B angles. For both triangles you have to use the A angle measurement and the b side measurement.
2. We can't use the law of sines to solve the triangles because then you would only be solving one triangle. In SSA triangles there could be two, one, or no triangles so you have to take extra steps in order to solve them.
3. In this situation there are two triangles because the side opposite the given triangle is greater than the height and less than the other given side. Because is makes two triangles you would have to solve for two triangles so there would be two C angles, two c sides, and two B angles. For both triangles you have to use the A angle measurement and the b side measurement.
There is only one triangle in this situation because the side opposite the given angle is greater than the height but less than the other given side measurement. To solve this you would use the law of sines and there would just be one solution for each angle and side measurement.
In this situation there are no triangles because the side opposite the given angle is less then the height so there would be no solution.