 6.1.6.1.5: In Exercises 1 8, solve each triangle. Round lengths of sides to th...
 6.1.6.1.6: In Exercises 1 8, solve each triangle. Round lengths of sides to th...
 6.1.6.1.7: In Exercises 1 8, solve each triangle. Round lengths of sides to th...
 6.1.6.1.8: In Exercises 1 8, solve each triangle. Round lengths of sides to th...
 6.1.6.1.9: In Exercises 1 8, solve each triangle. Round lengths of sides to th...
 6.1.6.1.10: In Exercises 1 8, solve each triangle. Round lengths of sides to th...
 6.1.6.1.11: In Exercises 1 8, solve each triangle. Round lengths of sides to th...
 6.1.6.1.12: In Exercises 1 8, solve each triangle. Round lengths of sides to th...
 6.1.6.1.13: In Exercises 9 16, solve each triangle. Round lengths to the neares...
 6.1.6.1.14: In Exercises 9 16, solve each triangle. Round lengths to the neares...
 6.1.6.1.15: In Exercises 9 16, solve each triangle. Round lengths to the neares...
 6.1.6.1.16: In Exercises 9 16, solve each triangle. Round lengths to the neares...
 6.1.6.1.17: In Exercises 9 16, solve each triangle. Round lengths to the neares...
 6.1.6.1.18: In Exercises 9 16, solve each triangle. Round lengths to the neares...
 6.1.6.1.19: In Exercises 9 16, solve each triangle. Round lengths to the neares...
 6.1.6.1.20: In Exercises 9 16, solve each triangle. Round lengths to the neares...
 6.1.6.1.21: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.22: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.23: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.24: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.25: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.26: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.27: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.28: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.29: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.30: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.31: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.32: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.33: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.34: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.35: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.36: In Exercises 17 32, two sides and an angle (SSA) of a triangle are ...
 6.1.6.1.37: In Exercises 33 38, find the area of the triangle having the given ...
 6.1.6.1.38: In Exercises 33 38, find the area of the triangle having the given ...
 6.1.6.1.39: In Exercises 33 38, find the area of the triangle having the given ...
 6.1.6.1.40: In Exercises 33 38, find the area of the triangle having the given ...
 6.1.6.1.41: In Exercises 33 38, find the area of the triangle having the given ...
 6.1.6.1.42: In Exercises 33 38, find the area of the triangle having the given ...
 6.1.6.1.43: In Exercises 39 40, find to the nearest tenth.
 6.1.6.1.44: In Exercises 39 40, find to the nearest tenth.
 6.1.6.1.45: In Exercises 41 42, find to the nearest tenth
 6.1.6.1.46: In Exercises 41 42, find to the nearest tenth
 6.1.6.1.47: In Exercises 43 44, use the given measurements to solve the followi...
 6.1.6.1.48: In Exercises 43 44, use the given measurements to solve the followi...
 6.1.6.1.49: In Exercises 45 46, find the area of the triangle with the given ve...
 6.1.6.1.50: In Exercises 45 46, find the area of the triangle with the given ve...
 6.1.6.1.51: Two firelookout stations are 10 miles apart, with station B direct...
 6.1.6.1.52: The Federal Communications Commission is attempting to locate an il...
 6.1.6.1.53: The figure shows a 1200yardlong sand beach and an oil platform in...
 6.1.6.1.54: A surveyor needs to determine the distance between two points that ...
 6.1.6.1.55: The Leaning Tower of Pisa in Italy leans at an angle of about 84.7....
 6.1.6.1.56: A pine tree growing on a hillside makes a 75 angle with the hill. F...
 6.1.6.1.57: The figure shows a shotput ring.The shot is tossed from and lands ...
 6.1.6.1.58: A pier forms an 85 angle with a straight shore. At a distance of 10...
 6.1.6.1.59: When the angle of elevation of the sun is 62, a telephone pole that...
 6.1.6.1.60: A leaning wall is inclined 6 from the vertical. At a distance of 40...
 6.1.6.1.61: Redwood trees in California s Redwood National Park are hundreds of...
 6.1.6.1.62: The figure at the top of the next page shows a cable car that carri...
 6.1.6.1.63: Lighthouse B is 7 miles west of lighthouse A. A boat leaves A and s...
 6.1.6.1.64: After a wind storm, you notice that your 16foot flagpole may be le...
 6.1.6.1.65: What is an oblique triangle?
 6.1.6.1.66: Without using symbols, state the Law of Sines in your own words
 6.1.6.1.67: Briefly describe how the Law of Sines is proved.
 6.1.6.1.68: What does it mean to solve an oblique triangle?
 6.1.6.1.69: What do the abbreviations SAA and ASA mean?
 6.1.6.1.70: Why is SSA called the ambiguous case?
 6.1.6.1.71: How is the sine function used to find the area of an oblique triangle?
 6.1.6.1.72: Write an original problem that can be solved using the Law of Sines...
 6.1.6.1.73: Use Exercise 53 to describe how the Law of Sines is used for throwi...
 6.1.6.1.74: You are cruising in your boat parallel to the coast, looking at a l...
 6.1.6.1.75: I began using the Law of Sines to solve an oblique triangle in whic...
 6.1.6.1.76: If I know the measures of the sides and angles of an oblique triang...
 6.1.6.1.77: When solving an SSA triangle using the Law of Sines, my calculator ...
 6.1.6.1.78: Under certain conditions, a fire can be located by superimposing a ...
 6.1.6.1.79: If you are given two sides of a triangle and their included angle, ...
 6.1.6.1.80: Two buildings of equal height are 800 feet apart. An observer on th...
 6.1.6.1.81: The figure shows the design for the top of the wing of a jet fighte...
 6.1.6.1.82: Find the obtuse angle rounded to the nearest degree, satisfying
 6.1.6.1.83: Simplify and round to the nearest whole number:
 6.1.6.1.84: Two airplanes leave an airport at the same time on different runway...
Solutions for Chapter 6.1: The Law of Sines
Full solutions for Precalculus  4th Edition
ISBN: 9780321559845
Solutions for Chapter 6.1: The Law of Sines
Get Full SolutionsChapter 6.1: The Law of Sines includes 80 full stepbystep solutions. This textbook survival guide was created for the textbook: Precalculus, edition: 4. This expansive textbook survival guide covers the following chapters and their solutions. Precalculus was written by and is associated to the ISBN: 9780321559845. Since 80 problems in chapter 6.1: The Law of Sines have been answered, more than 67546 students have viewed full stepbystep solutions from this chapter.

Arccosecant function
See Inverse cosecant function.

Common difference
See Arithmetic sequence.

Course
See Bearing.

Factor
In algebra, a quantity being multiplied in a product. In statistics, a potential explanatory variable under study in an experiment, .

Frequency
Reciprocal of the period of a sinusoid.

Independent variable
Variable representing the domain value of a function (usually x).

Inequality
A statement that compares two quantities using an inequality symbol

Inverse cosecant function
The function y = csc1 x

Linear system
A system of linear equations

Lower bound test for real zeros
A test for finding a lower bound for the real zeros of a polynomial

Mathematical model
A mathematical structure that approximates phenomena for the purpose of studying or predicting their behavior

Normal distribution
A distribution of data shaped like the normal curve.

Open interval
An interval that does not include its endpoints.

Radian measure
The measure of an angle in radians, or, for a central angle, the ratio of the length of the intercepted arc tothe radius of the circle.

Rational zeros theorem
A procedure for finding the possible rational zeros of a polynomial.

Rigid transformation
A transformation that leaves the basic shape of a graph unchanged.

Sinusoidal regression
A procedure for fitting a curve y = a sin (bx + c) + d to a set of data

Solve a system
To find all solutions of a system.

Transpose of a matrix
The matrix AT obtained by interchanging the rows and columns of A.

Ymin
The yvalue of the bottom of the viewing window.