1) In the interval [0,2π) find all the solutions possible (in radians ) : a) sin(x)=...

1. Solve sin(x)= √2/2 over the interval [0,2π). 2. Solve 4cos(x)+1=3 over the interval [0,2π). 3....

1. Solve sin(x)= √2/2 over the interval [0,2π). 2. Solve 4cos(x)+1=3 over the interval [0,2π). 3. Solve cos^2(x)+6=7 over the interval [0,2π). 4. How many solutions are there for the equation 4cos(x)+5=6 over the interval [0,2π).

1.Solve sin(x)=−0.61sin(x)=-0.61 on 0≤x<2π0≤x<2πThere are two solutions, A and B, with A < B 2.Solve 5cos(5x)=25cos(5x)=2...

1.Solve sin(x)=−0.61sin(x)=-0.61 on 0≤x<2π0≤x<2πThere are two solutions, A and B, with A < B 2.Solve 5cos(5x)=25cos(5x)=2 for the smallest three positive solutions.Give your answers accurate to at least two decimal places, as a list separated by commas 3.Solve 5sin(π4x)=35sin(π4x)=3 for the four smallest positive solutions 4.Solve for tt, 0≤t<2π0≤t<2π 21sin(t)cos(t)=9sin(t)21sin(t)cos(t)=9sin(t) 5.Solve for the exact solutions in the interval [0,2π)[0,2π). If the equation has no solutions, respond with DNE. 2sec2(x)=3−tan(x) 6.Give the smallest two solutions of sin(7θθ) = -0.6942 on [...

For the following exercises, find all exact solutions on [0, 2π) 23. sec(x)sin(x) − 2sin(x) =...

For the following exercises, find all exact solutions on [0, 2π) 23. sec(x)sin(x) − 2sin(x) = 0 25. 2cos^2 t + cos(t) = 1 31. 8sin^2 (x) + 6sin(x) + 1 = 0 32. 2cos(π/5 θ) = √3

1.Find all solutions on the interval [0, 2π) csc (2x)-9=0 2. Rewrite in terms of sin(x)...

1.Find all solutions on the interval [0, 2π) csc (2x)-9=0 2. Rewrite in terms of sin(x) and cos(x) Sin (x +11pi/6)

Find all solutions to the given equations. Then find all solutions in the interval [0,2pie) a....

Find all solutions to the given equations. Then find all solutions in the interval [0,2pie) a. 2sin^2(theta)-sin(theta)-1=0 b. tan(2theta)=cot(2theta) c. sin(3theta)-sin(6theta)=0 d.sec^2(theta)=2tan(theta) Please Show All Work

1, Solve cos(x)=0.17cos(x)=0.17 on 0≤x<2π0≤x<2π There are two solutions, A and B, with A < B...

1, Solve cos(x)=0.17cos(x)=0.17 on 0≤x<2π0≤x<2π There are two solutions, A and B, with A < B 2, Find the EXACT value of cos(A−B)cos(A-B) if sin A = 3434, cos A = √7474, sin B = √91109110, and cos B = 310310. cos(A−B)cos(A-B) = 3, Find all solutions of the equation 2cosx−1=02cosx-1=0 on 0≤x<2π0≤x<2π The answers are A and B, where A<BA<B A=? B=?

Identify the surface with parametrization x = 3 cos θ sin φ, y = 3 sin...

Identify the surface with parametrization x = 3 cos θ sin φ, y = 3 sin θ sin φ, z = cos φ where 0 ≤ θ ≤ 2π and 0 ≤ φ ≤ π. Hint: Find an equation of the form F(x, y, z) = 0 for this surface by eliminating θ and φ from the equations above. (b) Calculate a parametrization for the tangent plane to the surface at (θ, φ) = (π/3, π/4).

Let f(x)=sin x-cos x,0≤x≤2π Find all inflation point(s) of f. Find all interval(s) on which f...

Let f(x)=sin x-cos x,0≤x≤2π Find all inflation point(s) of f. Find all interval(s) on which f is concave downward.

1- For the following functions, find all critical numbers exactly. f(x) = x − 2 sin...

1- For the following functions, find all critical numbers exactly. f(x) = x − 2 sin x for −2π < x < 2π f(x) = e^−x −e^−3x for x > 0 f(x) = x^5 − 2x^3

1. Find all solutions to sin(2(x − π)) = 0

1. Find all solutions to sin(2(x − π)) = 0