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Warm-Up Honors Algebra 2 4/18/18

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1 Warm-Up Honors Algebra 2 4/18/18
1. Select each statement that is true about the graph of 𝑓 π‘₯ = sin π‘₯+3 βˆ’2 . A. amp: 1 B. amp: 2 C. midline: y=2 D. y-int: (0,-2) E. x-int: (0,0) 2. What are the solutions to the equation π‘₯ 2 βˆ’π‘₯+1=0? a βˆ’ π‘Žπ‘›π‘‘ b βˆ’ π‘Žπ‘›π‘‘ c βˆ’ 𝑖 π‘Žπ‘›π‘‘ 𝑖 d βˆ’ 𝑖 π‘Žπ‘›π‘‘ 𝑖 3. If π‘₯ = π‘₯+1 π‘Ž , for xβ‰₯1 ,and a is a constant, what is the value of a? a b. 5 6 c d

2 One (1) radian is the measure of the angle that creates an arc the same length as the radius. (It takes some thinking to figure out what that means, so look at the diagram and think about that for a minute.)

3 Since the circumference of a circle is 2πœ‹π‘Ÿ , arc lengths often have πœ‹ in them. So often (but not always), radian measures have πœ‹ in them too. Radian measures of angles come from the unit circle, which is a circle with the radius of 1. Radians essentially refer to the length of the intercepted arc on a unit circle. For that reason, 0Β° is the same as 0 radians and 360Β° is the same as 2πœ‹ radians (since that’s all the way around a circle because a circle has 360Β°).

4 If we know 0Β° is 0 radians and 360Β° is 2πœ‹ radians, how many degrees would πœ‹ radians be?
How many radians would 90Β° be? 45Β°? 135Β°? 225Β°? 270Β°? 315Β°?

5 Here’s the way to convert back and forth between degrees and radians.
If you know the degrees, multiply by a handy form of 1 that will get rid of the degrees and leave you with radians : 𝝅 πŸπŸ–πŸŽΒ° If you know the radians, multiply by a handy form of 1 that will get rid of the radians and leave you with degrees : πŸπŸ–πŸŽΒ° 𝝅

6 Convert 3πœ‹ 4 radians into degrees Step 1: Multiply 3πœ‹ 4 βˆ™ 180Β° πœ‹
Example 1: Convert 3πœ‹ 4 radians into degrees Step 1: Multiply 3πœ‹ 4 βˆ™ 180Β° πœ‹ 540πœ‹Β° 4πœ‹ Step 2: Simplify (cancel out the πœ‹) 135Β°

7 Example 2: Convert 150Β° into radians Step 1: Multiply 150Β°βˆ™ πœ‹ 180Β° 150πœ‹ 180 Step 2: Simplify 5πœ‹ 6

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