Find one value of x that solves the equation by using the inverse sine or cosine function on your calculator. These functions may be labeled as arcsin and arccos or as sin-¹ and cos¹. Give your answer in radians. Round your answer to three decimal places. a) When sin(x) = -0.25, then x = sin ¹(-0.25) = one solution. = b) When cos(x) = 0.24, then x = cos ¹(0.24) = solution. is is one cos(8) sin(0) Use the descriptions of sine and cosine values to match the possible values of the angle Descriptions sin(0) < 0, cos(0) < 0 sin(0) < 0, cos(0) > 0 sin(0) > 0, cos(0) = 0 sin(0) > 0, cos(0) > 0 sin(0) > 1, cos(0) < 1 a. Quadrant 1: 0 < 0 < b. Quadrant 3: T < 0 < c. Quadrant 4: d. 0 Values of = e. A = 3π 2 π 2 f. no such angle exists 3π 2 g. Quadrant 2: πT 2 ㅠ 2 3π 2 < 0 < 2πT < 0 T

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Find one value of x that solves the equation by using the inverse sine or cosine function on your calculator. These functions may be labeled as arcsin and arccos or as sin-¹ and cos¹. Give your answer in radians. Round your answer to three decimal places. a) When sin(x) = -0.25, then x = sin ¹(-0.25) = one solution. = b) When cos(x) = 0.24, then x = cos ¹(0.24) = solution. is is one

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cos(8) sin(0) Use the descriptions of sine and cosine values to match the possible values of the angle Descriptions sin(0) < 0, cos(0) < 0 sin(0) < 0, cos(0) > 0 sin(0) > 0, cos(0) = 0 sin(0) > 0, cos(0) > 0 sin(0) > 1, cos(0) < 1 a. Quadrant 1: 0 < 0 < b. Quadrant 3: T < 0 < c. Quadrant 4: d. 0 Values of = e. A = 3π 2 π 2 f. no such angle exists 3π 2 g. Quadrant 2: πT 2 ㅠ 2 3π 2 < 0 < 2πT < 0 <T