Which one doesn’t belong? Why?[br][br][img]data:image/png;base64,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[/img]

Make note of the different side lengths and angle measures in your triangle.  

Decide whether the triangle you made must be an identical copy of the triangle that Jada drew. Explain your reasoning.

Make note of the different side lengths and angle measures in your triangle.  

Decide whether the triangle you made must be an identical copy of the triangle that Andre drew. Explain your reasoning.

Make note of the different side lengths and angle measures in your triangle.  

Decide whether the triangle you made must be an identical copy of the triangle that Lin drew. Explain your reasoning.

Which of the previous 3 sets of measurements determine one unique triangle? Explain or show your reasoning.

Which of the above three triangles is impossible to draw?

How many unique triangles can you draw like this?

Find a value for [math]x[/math] that makes [math]-x[/math] less than [math]2x[/math].

Find a value for [math]x[/math] that makes [math]-x[/math] greater than [math]2x[/math].

A factory produces 3 bottles of sparkling water for every 7 bottles of plain water. If those are the only two products they produce, what percentage of their production is sparkling water? What percentage is plain?