Use the Law of Sines to solve (if possible) the triangle. If two solutions exist, find...

Use the Law of Sines to solve for all possible triangles that satisfy the given conditions....

Use the Law of Sines to solve for all possible triangles that satisfy the given conditions. (If an answer does not exist, enter DNE. Round your answers to one decimal place. Below, enter your answers so that ∠A1 is smaller than ∠A2.) b = 29,    c = 32,    ∠B = 21° ∠A1 = °      ∠A2 =   ° ∠C1 =   °      ∠C2 =   ° a1 =      a2 =

Use the Law of Sines to solve for all possible triangles that satisfy the given conditions....

Use the Law of Sines to solve for all possible triangles that satisfy the given conditions. (If an answer does not exist, enter DNE. Round your answers to one decimal place. Below, enter your answers so that ∠A1 is smaller than ∠A2.) b = 26,    c = 31,    ∠B = 27° ∠A1 = °      ∠A2 = ° ∠C1 = °      ∠C2 = ° a1 =      a2 =

Use the Law of Sines to solve for all possible triangles that satisfy the given conditions....

Use the Law of Sines to solve for all possible triangles that satisfy the given conditions. a = 12 2 + 4 6 ,    b = 24,    ∠A = 75° You may need the following values to solve this question: sin15° = 6 − 2 4 ,    sin75° = 6 + 2 4 ,    sin105° = 6 + 2 4

Use the Law of Cosines to find the remaining side and angles if possible. (Round your...

Use the Law of Cosines to find the remaining side and angles if possible. (Round your answers to two decimal places. If an answer does not exist, enter DNE.) a = 8, b = 12, γ = 67.7° c = α = ° β = °

1. Let the angles of a triangle be α, β, and γ, with opposite sides of...

1. Let the angles of a triangle be α, β, and γ, with opposite sides of length a, b, and c, respectively. Use the Law of Cosines and the Law of Sines to find the remaining parts of the triangle. (Round your answers to one decimal place.) α = 105°;  b = 3;  c = 10 a= β= ____ ° γ= ____ ° 2. Let the angles of a triangle be α, β, and γ, with opposite sides of length a, b,...

Let the angles of a triangle be α, β, and γ, with opposite sides of length...

Let the angles of a triangle be α, β, and γ, with opposite sides of length a, b, and c, respectively. Use the Law of Sines to find the remaining sides. (Round your answers to one decimal place.) β = 99°;  γ = 29°;  c = 20

Solve triangle ABC. (If an answer does not exist, enter DNE. Round your answers to one...

Solve triangle ABC. (If an answer does not exist, enter DNE. Round your answers to one decimal place. Below, enter your answers so that ∠A1 is smaller than ∠A2.) b = 129,    c = 168,    ∠B = 40° ∠A1 = °      ∠A2 = ° ∠C1 = °      ∠C2 = ° a1 =      a2 =

For each part, find all possible solutions to the given equations (if any exist). i )...

For each part, find all possible solutions to the given equations (if any exist). i ) x = 7 mod 9, x =3 mod 4 ii) 3x^2 +1 = 0 mod 10 iii) 3x+7 = 9 mod 10

Use vectors to find the interior angles of the triangle given the following sets of vertices....

Use vectors to find the interior angles of the triangle given the following sets of vertices. Round your answer, in degrees, to two decimal places. (−7,−4)(−7,−4), (−5,7)(−5,7), (3,2)

Solve for the remaining side(s) and angle(s) if possible. (Round your answers to two decimal places....

Solve for the remaining side(s) and angle(s) if possible. (Round your answers to two decimal places. If not possible, enter IMPOSSIBLE.) α = 3°, a = 63, b = 100 smaller β     β = ° γ = ° c = larger β     β = ° γ = ° c =