Let us assume the triangle is
, such that
and
, with a,b,c being the sides opposite angles A, B and C
respectively
We know, in a triangle, the angles add up to 180 degrees
Also, the question specifies,
As per the law of sines,
or
Hence
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(4) Using the Law of Sines, solve the non-right triangle where b = 2, C= 3, B = 40°
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(2) Solve the right triangle where a = 7, b= 11
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(3) Using the Law of Sines, solve the non-right triangle where B = 5°, A = 10°, c=5
(1) Solve the right triangle where A = 40°, b = 6 с a b
please answer and show all steps
(1) Solve the right triangle where A = 40°, b= 6 (2) Solve the right triangle where a = 7, b= 11
Solve the right triangle. 969 m 40° 26 In the right triangle ABC, with C = 90°, B=1° (Round to the nearest integer as needed.) .
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(3) Using the Law of Sines, solve the non-right triangle where B=5°, A= 10°, c=5 (4) Using the Law of Sines, solve the non-right triangle where b=2, c=3, B = 40° I
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4. The area of a triangle is determined by its base and height. Let B 12.15 and H*-8.25 which are the approximations of B and H respectively by the rounding method. Area of the triangle is ABH a) Determine the (absolute) error bound of B*and H* b) What is the approximated (absolute) error bound of the triangle's area?
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Solve for the unknown quantity specified using right-triangle
trigonometry, the Law of Cosines, and/or Law of Sines. State the
method, round the final answers to one decimal place, and include
appropriate units.
Determine the height x of the antenna. х 40° 250 87 feet
Solve the right triangle ABC, where C = 90°. Give angles in degrees and minutes. a = 19.4 cm, c = 46.1 cm bcm (Round to the nearest tenth as needed.) A= D' (Round to the nearest minute as needed.) (Round to the nearest minute as needed.) o 10 B =