91Ó°ÊÓ

Is it possible to solve a cubic statement?

Explain why the domain of tangent is restricted.

What is the maximum number of different solutions that a seventh degree statement could have?

What do the coordinates on the unit circle tell you?

In exercises \(5-8,\) determine the maximum possible number of intersections for the described functions. Two linear functions with different slopes

Determine the maximum possible number of intersections for the described functions. A cubic function and a constant function

In exercises 9 - 12, determine the minimum possible number of intersections for the described functions. Two linear functions with different slopes

Determine if it is possible to solve the statement for the given variable. If it is possible, solve but do not simplify your answer(s). If it is not possible, explain why. \(2 a^{2} b c^{3}+3 a b c^{2}+4 a^{2} c^{2}-3 b=4 c\) for \(a\)

In exercises \(15-18,\) use the unit circle to help you answer the given question. Sketch the a unit circle and the angle represented by \(\theta\) \(-\frac{2 \pi}{3}\). Find the ordered pair where this line intersects the unit circle and label this point on your sketch.