9 out of 10 based on 496 ratings. 4,837 user reviews.

# TRIGONOMETRY BEARING PROBLEM

Bearing problems in trigonometry
Most bearing word problems involving trigonometry and angles can be reduced to finding relationships between angles and the measurements of the sides of a triangle.
Bearing - Word Problems | Brilliant Math & Science Wiki
Is this answer helpful?Thanks!Give more feedbackThanks!How can it be improved?How can the answer be improved?Tell us howPeople also askHow to solve trigonometry word problems?How to solve trigonometry word problems?Steps involved in solving word problems in trigonometryStep 1 : Understanding the question and drawing the appropriate diagram are..Step 2 : If it is possible,we have to split the given information.Step 3 : We have to draw diagram almost for all of the word problems in trigonometry.Step 4 : Once we understand the given information clearly..How to Solve Trigonometry Word ProblemsSee all results for this questionWhat is the definition of bearing trigonometry?What is the definition of bearing trigonometry?Trigonometry definition,the branch of mathematics that deals with the relations between the sides and angles of plane or spherical triangles,and the calculations based on them. See more.Trigonometry | Define Trigonometry at DictionarySee all results for this questionHow is trigonometry related to geometry?How is trigonometry related to geometry?Trigonometry was developed after geometry for the purposes of astronomy. Both depend on distances and angles,but trigonometry uses the measurement of angles while geometry deals with angles only in terms of equality of angles and sums of angles.What is the difference between geometry and trigonometrySee all results for this questionIs trigonometry property of geometry or numbers?Is trigonometry property of geometry or numbers?sbebuildersspot And trigonometry has applications all over the place (e.g. in statistics). But trigonometry isn't a "property" of anything. It's not a generalization of geometry, nor is it a subfield of geometry. And, while it certainly uses numbers, it isn't a property of numbers.Is trigonometry a property of geometry or numbers? AndSee all results for this question
trigonometry - Trigonometric bearing problem - Mathematics
I have two trigonometric problems that I solved, however it does not match the answer in the book: 1) A yacht crosses the start line of a race on a bearing of \$31\$ degrees. After \$4.3\$ km, it rounds a buoy and sails on a bearing of \$346\$ degrees. When it is due north of its start, how far has it sailed altogether.The boat leaves at a bearing of 31 degrees and ends up north of it's start point. Therefore first corner of the triangle is 31 degrees. At the buoy it has a bearing of 346 which is NW - ish. This angle is equal to 135 degrees. 1st part of angle is 90-31= 59degrees using construction lines and the alternate angles theorem. The second part of the angle is 346-270=76 degrees. (the bearing minus the East-West construction line) so 76+59=135 degrees. The last angle is 180-135-31=14 degrees. I now use Sine rule: x/sin135 = 4.3/sin 14. x = 12 - which rounds to 13km.1For problem number 1, I agree with you, the pdf was totally wrong For problem number 2, I'm sorry to say this but you are wrong and the book is almost correct because the exact value of BC is 2604m For problem number 3, what is "if XY=4km, find the distance XY?" Your problems are hard to comprehend since they are grammatically wrong. "A yacht crosses the start line of a race on a bearing of 31 degrees." bearing of what now? to what point? if you are telling me it's implied in the succeeding sentence, the sentence including the word "bearing itself" must contain the objective point from the reference point. "The bearing of B and A is 65 degrees." i think the "and" there should be "from." try it, it totally fits the problem. for problem number 3, i didn't bother solving it because i don't really know what line was being solved. but what the heck. i ended up solving it, although im not sure with the answers \$ ZY=551056km\$ \$ZX=504195km\$0In problem number 1, I got the answer of 9 km (distance between the buoy and the north of the starting point). Then to find the total distance the yacht has sailed altogether, I added 9 km and 4.3 km. I got the answer of 13 km. I guess the unit in your book is wrong because it should be in km and I think the answer was rounded off in the nearest unit/whole number that's why it became 13.0This is the answer for the question no2 this is the answer for the question no3Bearing and Course Trigonometry Question - Stack Exchangetrigonometry - Solving a Problem with BearingSee more results
Click to view on Bing33:47Nov 05, 2014In this lesson I start out explaining how Bearing describes a direction of movement. I then work through 4 examples. Example 1 involves Right Triangle Trigon..Author: ProfRobBobViews: 79K
Videos of trigonometry bearing problem