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TRIGONOMETRY. Find trigonometric ratios using right triangles Solve problems using trigonometric ratios. Sextant. TRIGONOMETRIC RATIOS. TRIGONOMETRY comes from two Greek terms: trigon , meaning triangle metron , meaning measure. TRIGONOMETRIC RATIOS.
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TRIGONOMETRY • Find trigonometric ratios using right triangles • Solve problems using trigonometric ratios Sextant
TRIGONOMETRIC RATIOS • TRIGONOMETRY comes from two Greek terms: • trigon, meaning triangle • metron, meaning measure
TRIGONOMETRIC RATIOS • TRIGONOMETRY comes from two Greek terms: • trigon, meaning triangle • metron, meaning measure A ratio of the lengths of sides of a right triangleis called a trigonometric ratio.
TRIGONOMETRIC RATIOS • The three most common trigonometric ratios are: • Sine • Cosine • Tangent
Key ConceptTrigonometric Ratios B hypotenuse A C Begin with a right triangle
Key ConceptTrigonometric Ratios B leg opposite A hypotenuse A C leg opposite B measure of leg opposite A measure of hypotenuse sine of A =
Key ConceptTrigonometric Ratios B leg opposite A hypotenuse A C leg opposite B measure of leg opposite A measure of hypotenuse BC AB sine of A = sin A =
Key ConceptTrigonometric Ratios B leg opposite A hypotenuse A C leg opposite B measure of leg opposite A measure of hypotenuse BC AB sine of A = sin A = measure of leg opposite B measure of hypotenuse sine of B =
Key ConceptTrigonometric Ratios B leg opposite A hypotenuse A C leg opposite B measure of leg opposite A measure of hypotenuse BC AB sine of A = sin A = measure of leg opposite B measure of hypotenuse AC AB sine of B = sin B =
Key ConceptTrigonometric Ratios B hypotenuse A C leg adjacent to A measure of leg adjacent to A measure of hypotenuse cosine of A =
Key ConceptTrigonometric Ratios B hypotenuse A C leg adjacent to A measure of leg adjacent to A measure of hypotenuse AC AB cosine of A = cos A =
Key ConceptTrigonometric Ratios B leg adjacent to B hypotenuse A C leg adjacent to A measure of leg adjacent to A measure of hypotenuse AC AB cosine of A = cos A = measure of leg adjacent to B measure of hypotenuse cosine of B =
Key ConceptTrigonometric Ratios B leg adjacent to B hypotenuse A C leg adjacent to A measure of leg adjacent to A measure of hypotenuse AC AB cosine of A = cos A = measure of leg adjacent to B measure of hypotenuse BC AB cosine of B = cos B =
Key ConceptTrigonometric Ratios B leg opposite A and adjacent to B hypotenuse A C leg adjacent to A and opposite B measure of leg opposite A measure of leg adjacent to A tangent of A =
Key ConceptTrigonometric Ratios B leg opposite A and adjacent to B hypotenuse A C leg adjacent to A and opposite B measure of leg opposite A measure of leg adjacent to A BC AC tangent of A = tan A =
Key ConceptTrigonometric Ratios B leg opposite A and adjacent to B hypotenuse A C leg adjacent to A and opposite B measure of leg opposite A measure of leg adjacent to A BC AC tangent of A = tan A = measure of leg opposite B measure of leg adjacent to B tangent of B =
Key ConceptTrigonometric Ratios B leg opposite A and adjacent to B hypotenuse A C leg adjacent to A and opposite B measure of leg opposite A measure of leg adjacent to A BC AC tangent of A = tan A = measure of leg opposite B measure of leg adjacent to B AC BC tangent of B = tan B =
Reading Math • SOH – CAH – TOA • sin A = • cos A = • tan A = opp hyp adj hyp opp adj
TRIGONOMETRIC RATIOS • The three most common trigonometric ratios are: • Sine • Cosine • Tangent Sine function key Tangent function key Cosine function key
