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....

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. (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 =

1.a triangular pasture has sides of length 375 feet, 250 feet, and300 feet.calculate the area of...

1.a triangular pasture has sides of length 375 feet, 250 feet, and300 feet.calculate the area of the pasture 2. ambiguous case of the law of sines: two sides and an angle are given. Determine whether the given information results in one triangles, two triangles ,or no triganlge at all. clearly show how you use the law of sines. you do not need to solve the triangles. a) a=3, b=7, A=70 degrees. b) a = 20, c= 30,B=40 degrees. c) a...

Determine all values which satisfy the conclusion of the MVT for the given function and interval...

Determine all values which satisfy the conclusion of the MVT for the given function and interval h ( z ) = 4 z 3 − 8 z 2 + 7 z − 2 on [2,5]

1. Use the given conditions to find the exact value of the expression. sin(α) = -5/3,...

1. Use the given conditions to find the exact value of the expression. sin(α) = -5/3, tan(α) > 0, sin(α - 5π/3) 2. Use the given conditions to find the exact value of the expression. cos α = 24/25, sin α < 0, cos(α + π/6) 3. Use the given conditions to find the exact value of the expression. cot x = √3, cos x < 0, tan(x + π/6) 4. If α and β are acute angles such that...

Use the Laplace transform to solve the following, given the initial conditions: y^'' +5y^'+4y = 0...

Use the Laplace transform to solve the following, given the initial conditions: y^'' +5y^'+4y = 0 y(0)=1,y^' (0)=0.

(a) Separate the following partial differential equation into two ordinary differential equations: e 5t t 6...

(a) Separate the following partial differential equation into two ordinary differential equations: e 5t t 6 Uxx + 7t 2 Uxt − 6t 2 Ut = 0. (b) Given the boundary values Ux (0,t) = 0 and U(2π,t) = 0, for all t, write an eigenvalue problem in terms of X(x) that the equation in (a) must satisfy. That is, state (ONLY) the resulting eigenvalue problem that you would need to solve next. You do not need to actually solve...

Determine the value of z* such that it satisfies the conditions below. (Round your answers to...

Determine the value of z* such that it satisfies the conditions below. (Round your answers to two decimal places.) (a) −z* and z* separate the middle 94% of all z values from the most extreme 6%. z* =   (b) −z* and z* separate the middle 92% of all z values from the most extreme 8%. z* =   (c) −z* and z* separate the middle 97.8% of all z values from the most extreme 2.2%. z* =   (d) −z* and z*...

solve the differential equation: (d2y/dx2) + (P/EI)*y = -(Pe/EI) given boundary conditions: y(0)=y(L)=0 this is all...

solve the differential equation: (d2y/dx2) + (P/EI)*y = -(Pe/EI) given boundary conditions: y(0)=y(L)=0 this is all the given information. You didn't post a solution

Solve the following recurrence relations. If possible, use the Master Theorem. If the Master Theorem is...

Solve the following recurrence relations. If possible, use the Master Theorem. If the Master Theorem is not possible, explain why not and solve it using another approach (substitution with n = 3h or h - log3(n). a. T(n) = 7 * n2 + 11 * T(n/3) b. T(n) = 4 * n3 * log(n) + 27 * T(n/3)