MML PRECALCULUS ENHANCED
7th Edition
ISBN: 9780134119250
Author: Sullivan
Publisher: INTER PEAR
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Textbook Question
Chapter 8.1, Problem 66AE
Willis Tower Willis Tower in Chicago is the second tallest building in the United States and is topped by a high antenna. A surveyor on the ground makes the following measurement:
1. The angle of elevation from his position to the top of the building is .
2. The distance from his position to the top of the building is 2593 feet.
3. The distance from his position to the top of the antenna is 2743 feet.
(a) How far away from the (base of the) building is the surveyor located?
(b) How tall is the building?
(c) What is the angle of elevation from the surveyor to the top of the antenna?
(d) How tall is the antenna?
Source: Council on Tall Buildings and Urban Habitat
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Chapter 8 Solutions
MML PRECALCULUS ENHANCED
Ch. 8.1 - In a right triangle, if the length of the...Ch. 8.1 - If is an acute angle, solve the equation tan= 1 2...Ch. 8.1 - If is an acute angle, solve the equation sin= 1 2...Ch. 8.1 - True or False sin 52 =cos 48Ch. 8.1 - The sum of the measures of the two acute angles in...Ch. 8.1 - When you look up at an object, the acute angle...Ch. 8.1 - True or False In a right triangle, if two sides...Ch. 8.1 - True or False In a right triangle, if we know the...Ch. 8.1 - In Problems 9-18, find the exact value of the six...Ch. 8.1 - In Problems 9-18, find the exact value of the six...
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If the solution is irrational,...Ch. 8.3 - Given tan= 2 6 5 and cos= 5 7 , find the exact...Ch. 8.3 - Find an equation for the graph.Ch. 8.4 - The area K of a triangle whose base is b and whose...Ch. 8.4 - If two sides a and b and the included angle C are...Ch. 8.4 - The area K of a triangle with sides a , b , and c...Ch. 8.4 - True or False The area of a triangle equals...Ch. 8.4 - Given two sides of a triangle, b and c , and the...Ch. 8.4 - Heron's Formula is used to find the area of...Ch. 8.4 - Prob. 7SBCh. 8.4 - Prob. 8SBCh. 8.4 - Prob. 9SBCh. 8.4 - Prob. 10SBCh. 8.4 - Prob. 11SBCh. 8.4 - Prob. 12SBCh. 8.4 - Prob. 13SBCh. 8.4 - Prob. 14SBCh. 8.4 - Prob. 15SBCh. 8.4 - Prob. 16SBCh. 8.4 - Prob. 17SBCh. 8.4 - Prob. 18SBCh. 8.4 - Prob. 19SBCh. 8.4 - Prob. 20SBCh. 8.4 - Prob. 21SBCh. 8.4 - Prob. 22SBCh. 8.4 - In Problems 15-26, find the area of each triangle....Ch. 8.4 - Prob. 24SBCh. 8.4 - Prob. 25SBCh. 8.4 - In Problems 15-26, find the area of each triangle....Ch. 8.4 - Area of an ASA Triangle If two angles and the...Ch. 8.4 - Area of a Triangle Prove the two other forms of...Ch. 8.4 - In Problems 29-34, use the results of Problem 27...Ch. 8.4 - In Problems 29-34, use the results of Problem 27...Ch. 8.4 - In Problems 29-34, use the results of Problem 27...Ch. 8.4 - In Problems 29-34, use the results of Problem 27...Ch. 8.4 - In Problems 29-34, use the results of Problem 27...Ch. 8.4 - In Problems 29-34, use the results of Problem 27...Ch. 8.4 - Area of a Segment Find the area of the segment...Ch. 8.4 - Area of a Segment Find the area of the segment of...Ch. 8.4 - Cost of a Triangular Lot The dimensions of a...Ch. 8.4 - Amount of Material to Make a Tent A cone-shaped...Ch. 8.4 - Prob. 39AECh. 8.4 - Dimensions of Home Plate The dimensions of home...Ch. 8.4 - Computing Areas See the figure. Find the area of...Ch. 8.4 - Geometry See the figure, which shows a circle of...Ch. 8.4 - Approximating the Area of a Lake To approximate...Ch. 8.4 - Bermuda Triangle The Bermuda Triangle is roughly...Ch. 8.4 - The Flatiron Building Completed in 1902 in New...Ch. 8.4 - Area of a Quadrilateral Bretschneider’s Formula...Ch. 8.4 - The Cow Problem A cow is tethered to one corner of...Ch. 8.4 - Perfect Triangles A perfect triangle is one having...Ch. 8.4 - If h 1 , h 2 , and h 3 are the altitudes dropped...Ch. 8.4 - Show that a formula for the altitude h from a...Ch. 8.4 - Inscribed Circle For Problems 55-58, the lines...Ch. 8.4 - Inscribed Circle For Problems 55-58, the lines...Ch. 8.4 - Inscribed Circle For Problems 55-58, the lines...Ch. 8.4 - Inscribed Circle For Problems 55-58, the lines...Ch. 8.4 - A triangle has vertices A( 0,0 ) , B( 1,0 ) , and...Ch. 8.4 - What do you do first if you are asked to find the...Ch. 8.4 - What do you do first if you are asked to find the...Ch. 8.4 - State the area of an SAS triangle in words.Ch. 8.4 - Without graphing, determine whether the quadratic...Ch. 8.4 - Solve the inequality: x+1 x 2 9 0Ch. 8.4 - P=( 7 3 , 2 3 ) is the point on the unit circle...Ch. 8.4 - Establish the identity: cscsin=coscotCh. 8.5 - The amplitude A and period T of f( x )=5sin( 4x )...Ch. 8.5 - The motion of an object obeys the equation d=4cos(...Ch. 8.5 - When a mass hanging from a spring is pulled down...Ch. 8.5 - True or False If the distance d of an object from...Ch. 8.5 - In Problems 5-8, an object attached to a coiled...Ch. 8.5 - In Problems 5-8, an object attached to a coiled...Ch. 8.5 - In Problems 5-8, an object attached to a coiled...Ch. 8.5 - In Problems 5-8, an object attached to a coiled...Ch. 8.5 - Rework Problem 5 under the same conditions, except...Ch. 8.5 - Rework Problem 6 under the same conditions, except...Ch. 8.5 - Rework Problem 7 under the same conditions, except...Ch. 8.5 - Rework Problem 8 under the same conditions, except...Ch. 8.5 - In Problems 13-20, the displacement d (in meters)...Ch. 8.5 - In Problems 13-20, the displacement d (in meters)...Ch. 8.5 - In Problems 13-20, the displacement d (in meters)...Ch. 8.5 - In Problems 13-20, the displacement d (in meters)...Ch. 8.5 - In Problems 13-20, the displacement d (in meters)...Ch. 8.5 - In Problems 13-20, the displacement d (in meters)...Ch. 8.5 - In Problems 13-20, the displacement d (in meters)...Ch. 8.5 - In Problems 13-20, the displacement d (in meters)...Ch. 8.5 - In Problems 21-24, graph each damped vibration...Ch. 8.5 - In Problems 21-24, graph each damped vibration...Ch. 8.5 - In Problems 21-24, graph each damped vibration...Ch. 8.5 - In Problems 21-24, graph each damped vibration...Ch. 8.5 - In Problems 25-32, use the method of adding...Ch. 8.5 - In Problems 25-32, use the method of adding...Ch. 8.5 - In Problems 25-32, use the method of adding...Ch. 8.5 - In Problems 25-32, use the method of adding...Ch. 8.5 - In Problems 25-32, use the method of adding...Ch. 8.5 - In Problems 25-32, use the method of adding...Ch. 8.5 - In Problems 25-32, use the method of adding...Ch. 8.5 - In Problems 25-32, use the method of adding...Ch. 8.5 - In Problems 33-38, (a) use the Product-to-Sum...Ch. 8.5 - In Problems 33-38, (a) use the Product-to-Sum...Ch. 8.5 - In Problems 33-38, (a) use the Product-to-Sum...Ch. 8.5 - In Problems 33-38, (a) use the Product-to-Sum...Ch. 8.5 - In Problems 33-38, (a) use the Product-to-Sum...Ch. 8.5 - In Problems 3338, (a) use the ProducttoSum...Ch. 8.5 - In Problems 39-44, an object of mass m (in grams)...Ch. 8.5 - In Problems 39-44, an object of mass m (in grams)...Ch. 8.5 - In Problems 39-44, an object of mass m (in grams)...Ch. 8.5 - In Problems 39-44, an object of mass m (in grams)...Ch. 8.5 - In Problems 39-44, an object of mass m (in grams)...Ch. 8.5 - In Problems 39-44, an object of mass m (in grams)...Ch. 8.5 - In Problems 45-50. the distance d (in meters) of...Ch. 8.5 - In Problems 45-50. the distance d (in meters) of...Ch. 8.5 - In Problems 45-50. the distance d (in meters) of...Ch. 8.5 - In Problems 45-50. the distance d (in meters) of...Ch. 8.5 - In Problems 45-50. the distance d (in meters) of...Ch. 8.5 - In Problems 45-50. the distance d (in meters) of...Ch. 8.5 - Loudspeaker A loudspeaker diaphragm is oscillating...Ch. 8.5 - Colossus Added to Six Flags St. Louis in 1986, the...Ch. 8.5 - Tuning Fork The end of a tuning fork moves in...Ch. 8.5 - Tuning Fork The end of a tuning fork moves in...Ch. 8.5 - Charging a Capacitor See the illustration. 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- == 1. A separable differential equation can be written in the form hy) = g(a) where h(y) is a function of y only, and g(x) is a function of r only. All of the equations below are separable. Rewrite each of these in the form h(y) = g(x), then find a general solution by integrating both sides. Determine whether the solutions you found are explicit (functions) or implicit (curves but not functions) (a) 1' = — 1/3 (b) y' = = --- Y (c) y = x(1+ y²)arrow_forwardA circle of radius r centered at the point (0,r) in the plane will intersect the y-axis at the origin and the point A=(0,2r), as pictured below. A line passes through the point A and the point C=(11/2,0) on the x-axis. In this problem, we will investigate the coordinates of the intersection point B between the circle and the line, as 1 → ∞ A=(0,2r) B (0,0) (a) The line through A and C has equation: y= 2 117 x+27 (b) The x-coordinate of the point B is 4472 121,2 +4 40 (c) The y-coordinate of the point B is +27 121 44 (d) The limit as r→ ∞ of the x-coordinate of B is 121 (if your answer is oo, write infinity).arrow_forward1. Show that the vector field F(x, y, z) = (2x sin ye³)ix² cos yj + (3xe³ +5)k satisfies the necessary conditions for a conservative vector field, and find a potential function for F.arrow_forward
- 7. Let F(x1, x2) (F₁(x1, x2), F2(x1, x2)), where = X2 F1(x1, x2) X1 F2(x1, x2) x+x (i) Using the definition, calculate the integral LF.dy, where (t) = (cos(t), sin(t)) and t = [0,2]. [5 Marks] (ii) Explain why Green's Theorem cannot be used to find the integral in part (i). [5 Marks]arrow_forward6. Sketch the trace of the following curve on R², п 3п (t) = (t2 sin(t), t2 cos(t)), tЄ 22 [3 Marks] Find the length of this curve. [7 Marks]arrow_forwardTotal marks 10 Total marks on naner: 80 7. Let DCR2 be a bounded domain with the boundary OD which can be represented as a smooth closed curve : [a, b] R2, oriented in the anticlock- wise direction. Use Green's Theorem to justify that the area of the domain D can be computed by the formula 1 Area(D) = ½ (−y, x) · dy. [5 Marks] (ii) Use the area formula in (i) to find the area of the domain D enclosed by the ellipse y(t) = (10 cos(t), 5 sin(t)), t = [0,2π]. [5 Marks]arrow_forward
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