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Published byMagdalene Malone Modified over 9 years ago
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Chapter 14 Day 5 Trig Functions of Any Angle
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We can also evaluate trig functions of an angle that contains a point that isn’t necessarily on the unit circle. We just need to adjust the trig ratio for the different. When given the coordinates of a point on the terminal side of an angle, θ, in standard position, we can evaluate the six trig functions using these rules: radius
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cosθ =sec θ = sin θ =csc θ = tan θ =cot θ = Where x is the of the point, y is the of the point, and r is the of the circle. x-coordinate y-coordinate radius
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You will need to sketch a right triangle and use the theorem to find the length of the radius. Pythagorean
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Find the value of the six trigonometric functions of the angle θ whose terminal side in standard position passes through the given point. If the function is not defined for the angle, state so. 5.
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Find the value of the six trigonometric functions of the angle θ whose terminal side in standard position passes through the given point. If the function is not defined for the angle, state so. 6.
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Find the value of the six trigonometric functions of the angle θ whose terminal side in standard position passes through the given point. If the function is not defined for the angle, state so. Try these on your own! 7. 8.
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We can also use the same rules when given the value of one trig function and the quadrant that it lies in. Use the given to get x, y, and/or r and then use the Pythagorean theorem to find the missing value.
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Find the values of the other five trigonometric functions of the angle in the given quadrant having the given function value. 9.
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Find the values of the other five trigonometric functions of the angle in the given quadrant having the given function value. 10.
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Find the values of the other five trigonometric functions of the angle in the given quadrant having the given function value. 11.
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Find the values of the other five trigonometric functions of the angle in the given quadrant having the given function value. 12.
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Find and if is the point where the terminal side of in standard position intersects the unit circle and x and y satisfy the given conditions. 13.
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Find and if is the point where the terminal side of in standard position intersects the unit circle and x and y satisfy the given conditions. 14.
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