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14-5 Sum and Difference of Angles Formulas. The Formulas.

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Presentation on theme: "14-5 Sum and Difference of Angles Formulas. The Formulas."— Presentation transcript:

1 14-5 Sum and Difference of Angles Formulas

2 The Formulas

3 Example 5-1a Find the exact value of sin 75 . Use the formula. Sum of angles Evaluate each expression. Example:

4 Example 5-1b Multiply. Simplify. Answer:

5 Example 5-1c Find the exact value of cos (–75  ). Use the formula Difference of angles Evaluate each expression. Another one:

6 Example 5-1d Multiply. Simplify. Answer:

7 Example 5-1e Find the exact value of each expression. a. sin 105  b. cos (–120  ) Answer: More:

8 Example 5-3a Verify that is an identity. Difference of angles formula Evaluate each expression. Simplify. Original equation Answer: Another one:

9 Example 5-3b Verify that is an identity. Simplify. Answer: Original equation Difference of angles formula Evaluate each expression. Another one:

10 Example 5-3c Verify that each of the following is an identity. a. Answer: Another one:

11 14-6 Double and Half Angle Formulas

12 Example 6-1a Find the value of if and is between Use the identity First find the value of Subtract. Example:

13 Example 6-1a Find the square root of each side. Since is in the first quadrant, cosine is positive. Thus,

14 Example 6-1a Now find Double-angle formula Simplify. Answer: The value of Example:

15 Example 6-1a Find the value of if and is between Double-angle formula Simplify. Answer: The value of cos 2  Example:

16 Example 6-1b Find the value of each expression if and is between a. b. Answer: Some more:

17 Example 6-2a Findis in the second quadrant. we must findfirst. Since Example:

18 Example 6-2a Simplify. Take the square root of each side. Sinceis in the second quadrant, Half-angle formula

19 Example 6-2a Simplify the radicand. Rationalize. Multiply.

20 Example 6-2a Thus, is Answer: Sinceis between positive and equals

21 Example 6-2b Findis in the fourth quadrant. Answer: Yep, there is more:

22 Example 6-3a Find the exact value ofby using the half-angle formulas. Example:

23 Example 6-3a Simplify the radicand. Simplify the denominator. Answer:

24 Example 6-3a Find the exact value ofby using the half-angle formulas. Example:

25 Example 6-3a Simplify the radicand. Simplify the denominator.

26 Example 6-3a Answer: Sinceis in the third quadrant, is negative. Thus,

27 Example 6-3b Find the exact value of each expression by using the half-angle formulas. a. b. Answer: A few more:

28 Example 6-4a Verify that is an identity. Answer: Original equation Distributive Property Simplify. Multiply. Example:

29 Example 6-4b Verify that is an identity. Answer: This could be the last one:

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