Understanding Limits and Trigonometric Functions

To prove the limit of sine theta over theta as theta approaches zero.

To explain the properties of a unit circle.

To solve a complex algebraic equation.

To demonstrate the use of trigonometric identities.

The tangent of theta.

The cosine of theta.

The radius of the circle.

The sine of theta.

As the adjacent side over the opposite side.

As the radius of the unit circle.

As the opposite side over the adjacent side.

As the hypotenuse of a triangle.

Theta over two times pi.

The absolute value of sine theta over two.

1/2 times the base times the height.

The absolute value of tangent theta over two.

The wedge is equal to the blue triangle.

The salmon triangle is larger than the wedge.

The wedge is smaller than the blue triangle.

The blue triangle is smaller than the salmon triangle.

To maintain the direction of the inequalities.

To simplify the expression for tangent theta.

To change the direction of the inequalities.

To eliminate the cosine function.

Because sine and theta have the same sign.

Because sine and theta have opposite signs.

Because the unit circle is not defined there.

Because cosine is always negative.

The Squeeze Theorem.

The Pythagorean Theorem.

The Fundamental Theorem of Calculus.

The Binomial Theorem.

Undefined.

Zero.

One.

Negative one.

It is undefined.

It is equal to one.

It is less than one.

It is greater than one.