Math 2 Unit 6 Day 1: Evaluating and Solving with Trig Functionsname:______

Math 2 Unit 6 – Day 1: Evaluating and Solving with Trig FunctionsName:______

Evaluate an Expression
To evaluate an expression means to ______a given value in for a variable and ______
Evaluate the following:
3x if x = 6
-4x2 -7x + 2 if x = -6
Sine, Cosine and Tangent
Sine, Cosine and Tangent are ______functions that are related to ______and ______.
We will discuss more about where they come from later! 
We can evaluate a ______, ______or ______just like any other expression.
We have buttons on our calculator for sine, cosine and tangent
Sine 
Cosine 
Tangent 
When evaluating sine, cosine or tangent, we must remember that the value we substitute into the expression represents an______.
Angles are measured in
______
______
We have to check our mode to make sure the calculator knows what measure we are using!
In this class, we will always use Degrees, but you should know that radians exist!

 Make sure Degree is highlighted!

To solve an equation means to “______” all the operations to get the variable by itself
To “undo” an operation means to use the ______
The inverse operation of addition is ______
The inverse operation of multiplication is ______
The inverse operation of squaring is ______
Solve the following equations using inverse operations:
3x + 5 = 14

We can solve equations involving ______, ______and ______just like any other equation!
Inverse operations of sine, cosine and tangent
Sine 
Cosine 
Tangent 
For some values, ______and ______will not have a solution!
Example – Solve: cos(x) = .9205

CCMII

Unit 5 Lesson 1a Evaluating Sine, Cosine and TangentTEACHER KEY

To evaluate an expression means to substitute a given value in for a variable and simplify
Evaluate the following:
3x if x = 618

Sine, Cosine and Tangent are trigonometric functions that are related to triangles and angles
We will discuss more about where they come from later! 
We can evaluate a sine, cosine or tangent just like any other expression
We have buttons on our calculator for sine, cosine and tangent
Sine SIN
Cosine COS
Tangent  TAN
When evaluating sine, cosine or tangent, we must remember that the value we substitute into the expression represents an angle
Angles are measured in
Degrees
Radians
We have to check our mode to make sure the calculator knows what measure we are using!
In this class, we will always use Degrees, but you should know that radians exist!

MODE Make sure Degree is highlighted!

To solve an equation means to “undo” all the operations to get the variable by itself
To “undo” an operation means to use the inverse operation
The inverse operation of addition is subtraction
The inverse operation of multiplication is division
The inverse operation of squaring is taking a square root
Solve the following equations using inverse operations:
3x + 5 = 14x = 3

We can solve equations involving sine, cosine and tangent just like any other equation!
Inverse operations of sine, cosine and tangent
Sine SIN-1
Cosine COS-1
Tangent TAN-1
For some values, sine andcosinewill not have a solution.
Solve the following equations and express your answer in degrees:
sin (x) = 0.636.87o