Given the anglles of the triangles below, find the values of the six trigonometric ratios. T hen answer the questions that follow. Let a be the leg of a 45°-45° - 90° Triangle. Let a be the shorter leg of a 30°- 60°-90° Triangle. 45° 60° ave 2a a a 30° 45° a/3 a sin 45° = sec 45° = sin 30° = sec 30° = %3D %3D %3D cos 45° = csc 45° = cos 30° = csc 30° = %3D tan 45° = cot 45° = tan 30° = cot 30° = %3D %3D
Given the anglles of the triangles below, find the values of the six trigonometric ratios. T hen answer the questions that follow. Let a be the leg of a 45°-45° - 90° Triangle. Let a be the shorter leg of a 30°- 60°-90° Triangle. 45° 60° ave 2a a a 30° 45° a/3 a sin 45° = sec 45° = sin 30° = sec 30° = %3D %3D %3D cos 45° = csc 45° = cos 30° = csc 30° = %3D tan 45° = cot 45° = tan 30° = cot 30° = %3D %3D
Given the anglles of the triangles below, find the values of the six trigonometric ratios. T hen answer the questions that follow. Let a be the leg of a 45°-45° - 90° Triangle. Let a be the shorter leg of a 30°- 60°-90° Triangle. 45° 60° ave 2a a a 30° 45° a/3 a sin 45° = sec 45° = sin 30° = sec 30° = %3D %3D %3D cos 45° = csc 45° = cos 30° = csc 30° = %3D tan 45° = cot 45° = tan 30° = cot 30° = %3D %3D
Given the angles of the triangles below, find the values of the six trigonometric ratios.
Figure in plane geometry formed by two rays or lines that share a common endpoint, called the vertex. The angle is measured in degrees using a protractor. The different types of angles are acute, obtuse, right, straight, and reflex.
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