Trigonometry
 👍 0
 👎 0
 👁 72

 👍 0
 👎 0
posted by Damon
Respond to this Question
Similar Questions

Precalculus
In most geometry courses, we learn that there's no such thing as "SSA Congruence". That is, if we have triangles ABC and DEF such that AB = DE, BC = EF, and angle A = angle D, then we cannot deduce that ABC and DEF are congruent.
asked by John on February 24, 2014 
Trigonometry
Solve SSA: B= 12.1 degrees b= 16 a= 23.9
asked by Peter on May 30, 2011 
Trigonometry
Solve SSA: B=12.1 degrees b= 15 a= 23.9
asked by Sean on May 30, 2011 
Trigonometry
Solve SSA: A= 78 degrees a= 30 b= 61
asked by Sean on May 30, 2011 
Math
Which of the following values best approximates of the length of c in triangle ABC where c = 90(degrees), b = 12, and B = 15(degrees)? c = 3.1058 c = 12.4233 c = 44.7846 c = 46.3644 In triangle ABC, find b, to the nearest degree,
asked by Max on January 26, 2018 
Algebra 2
Using the information given about a triangle, which law must you use to solve the triangle? Law of Sines, Law of Cosines, or Neither. ASA SSS SAS AAA SSA AAS
asked by Katy on February 13, 2012 
Trigonometry/Geometry
In most geometry courses, we learn that there's no such thing as "SSA Congruence". That is, if we have triangles ABC and DEF such that AB = DE, BC = EF, and angle A = angle D, then we cannot deduce that ABC and DEF are congruent.
asked by Sam on November 19, 2013 
Math please help!!
In most geometry courses, we learn that there's no such thing as "SSA Congruence". That is, if we have triangles ABC and DEF such that AB=DE, BC=EF, and ∠A=∠D, then we cannot deduce that ABC and DEF are congruent. However,
asked by Bob on July 19, 2016 
Trigonometry/Geometry  Law of sines and cosines
In most geometry courses, we learn that there's no such thing as "SSA Congruence". That is, if we have triangles ABC and DEF such that AB = DE, BC = EF, and angle A = angle D, then we cannot deduce that ABC and DEF are congruent.
asked by Sam on November 21, 2013 
angle measurements HELP ME PLZ QUICKLY!!!
name the type or triangle with angle measurements of 30 degrees , 60 degrees, and 90 degrees. A. a acute triangle B. a equilateral triangle C. right triangle D. a Obtuse ( I think its a right am I right? btw I no what this
asked by mia on April 22, 2014