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25-28 Values of Trigonometric Functions Find the values of the trigonometric function of
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ALGEBRA AND TRIGONOMETRY-WEBASSIGN
- Take this test as you would take a test in class. When you are finished, check your work against the answers given in the back of the book. Given that is an acute angle and tan=32, find the exact values of the other five trigonometric functions of .arrow_forwardSketch a 25125' ray on a Cartesian coordinate system and from a point on the ray sketch a right triangle. Label the sides of the triangle + or . Determine the reference angle and the sine, cosine, tangent, cotangent, secant, and cosecant functions for the angle. Round the answers to 5 decimal places.arrow_forwardUsing the Pythagorean Identities Find the values of the trigonometric functions of t from the given information. sint=-45, terminal point of t is in Quadrant IVarrow_forward
- Fill in the blanks. The equation 2tan2x3tanx+1=0 is a trigonometric equation of type.arrow_forwardHeight of a Balloon A 680-ft rope anchors a hot-air balloon as shown in the figure. a Express the angle as a function of the height h of the balloon . b Find the angle if the balloon is 500 ft high.arrow_forwardGeometry Use a compass to sketch a quarter of a circle of radius 10 centimeters. Using a protractor, construct an angle of 20 in standard position (see figure). Drop a perpendicular line from the point of intersection of the terminal side of the angle and the arc of the circle. By actual measurement, calculate the coordinates x,y of the point of intersection and use these measurements to approximate the six trigonometric functions of a 20 angle.arrow_forward
- Take this test as you would take a test in class. When you are finished, check your work against the answers given in the back of the book. Find the exact values of the six trigonometric functions of the angle shown in the figure.arrow_forwardHeight of a Tower A six-foot person walks from the base of a broadcasting tower directly toward the tip of the shadow cast by the tower. When the person is 132 feet from the tower and 3 feet from the tip of the shadow, the person’s shadow starts to appear beyond the tower’s shadow. (a) Draw a right triangle that gives a visual representation of the problem. Label the known quantities of the triangle and use a variable to represent the height of the tower. (b) Use a trigonometric function to write an equation involving the unknown quantity. (c) What is the height of the tower?arrow_forwardMotion of a Projectile If a projectile (such as a bullet) is fired into the air with an initial velocity v at an angle of elevation (see Figure 10), then the height h of the projectile at time t is given by h=16t2+vtsin Give the equation for h, if v is 600 feet per second and is 45. (Leave your answer in exact value form.)arrow_forward
- DISCUSS: Cofunction Identities In the right triangle shown, explain why v=(/2)u. Explain how you can obtain all six cofunction identities from this triangle for (0u/2) Note that u and v are the complementary angles. So the cofunction identities state that a trigonometric function of an angle u is equal to the corresponding cofunction of the complementary angle v .arrow_forwardA television camera at ground level films the lift-off of a space shuttle at a point 750 meters from the launch pad (see figure). Let be the angle of elevation to the shuttle and let s be the height of the shuttle. (a) Write as a function of s. (b) Find when s=300 meters and s=1200 meters.arrow_forwardRefraction When you stand in shallow water and look at an object below the surface of the water, the object will look farther away from you than it really is. This is because when light rays pass between air and water, the water refracts, or bends, the light rays. The index of refraction for water is 1.333. This is the ratio of the sine of 1 and the sine of 2 (see figure). (a) While standing in water that is 2 feet deep, you look at a rock at angle 1=60 (measured from a line perpendicular to the surface of the water). Find 2. (b) Find the distances x and y. (c) Find the distance d between where the rock is and where it appears to be. (d) What happens to d as you move closer to the rock? Explain.arrow_forward
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