The answer is π/6. Steps: Rewrite arccos(√ 3 / 2) as cos(x) = √ 3 / 2. √ 3 / 2 is the only value that fits, for arccos has a range of 0° ≤ y ≤ 180°.

The answer is √(1-4x^2). Steps: Draw a right triangle. We know that the stuff in the parentheses is a side length because of the inverse trig function. Sin is opposite over hypotenuse so 2x is the opposite and 1 is the hypotenuse. Use Pythagorean Theorem to find that the adjacent side is √(1-4x^2). Cos is adjacent over hypotenuse, so the answer is √(1-4x^2)

The answer is 180°. Steps: Subtract 1 from both sides. Then, divide both sides by negative 1. Finally, take the arcos of both sides so that you are left with x = arccos(-1), making x = 180°.

The answers are π/3, 2π/3, 4π/3, and 5π/3. Steps: Take the square root of both sides to get sec(x) = ±2. Sec is 1/cos, so it equals 1/cosx = ±2 which can be rearranged to equal cos(x) = ±1/2. Cos(x) = 1/2 at π/3 and 5π/3. Cos(x) = -1/2 at 2π/3 and 4π/3.

The answers are π/6, 5π/6, 7π/6, and 11π/6. Steps: Factor out the csc^2(x) to get (csc^2(x))(csc^2(x-4)) = 0. Using difference of squares, factor out (csc^2(x-4)) into csc(x)-2 and csc(x)+2 to get (csc^2(x))(csc(x)-2)(csc(x)+2)=0 Csc^2(x) can’t equal zero, so it doesn't give any solutions Csc(x)-2 = 0 simplifies to sin(x) = -1/2, which gives π/6 and 5π/6 as solutions. Csc(x)+2 = 0 simplifies to sin(x) = 1/2, which gives 7π/6 and 11π/6 as solutions.

The answer is 3/4. Steps: Remember that arcsin has a domain of -1 ≤ x ≤ 1 and is the inverse of sin. Therefore, any number that suits this domain requirement will allow you to compose the two functions by canceling them.

The answer is 1/√(1-(x+1)^2). Steps: Draw a right triangle. We know that x+1 in the parentheses is a side length because of the inverse trig function. Cos is adjacent over hypotenuse, so the hypotenuse is 1 and the adjacent side is x + 1. Use pythagorean theorem to find that the opposite side is √(1-(x+1)^2). Csc is hypotenuse over opposite, so the answer is 1/√(1-(x+1)^2).

There is no solution to this problem. Steps: Subtract 3 from both sides. Then, if we attempt to take the square root from both sides, we realize that we can't take the square root of a negative number, which makes the equation unsolvable.

The answers are 0, π/4, π, and 5π/4. Steps: Set each factor equal to zero. Sin(x) = 0 at 0 and π. Tan(x) = 1 at π/4 and 5π/4. Cosx = 1 at 0.

There is no solution. Steps: Subtract 5 from both sides. Since we can't take the square root of negative 5, there is no solution to the equation.

The answer is √ 2 / 2. Steps: First, find arctan(1) by rewriting it as tan(x) = 1. Arctan has a domain of −90° < y < 90°, so the only answer is 45°. Plug 45° back into the original problem, cos(arctan(1)), in place of arctan(1). cos(45)= √ 2 / 2

The answer is adjacent=x, opposite=4, and hypotenuse=√x^2+16. Steps: arcot(x/4) means that cotθ=x/4. Cot=adjacent/opposite, so the adjacent side = x, and the opposite side = 4. Now you have the two legs. In order to find the hypotenuse, use the pythagorean theorem.

The answer is 315. Steps: Take the arcsec of both sides to cancel out sec on the left side. We now have (x + 45) = arcsec(1). The arcsec(1) = 360. Then, substract 45 from both sides, and you will get 315 as your answer.

The answers are 2π/3 and 4π/3. Steps: Substitute cos(2x) with 2cos^2(x-1) and move everything to one side of the equation to get (2cos^2(x-1))-cos(x) = 0. Factor to get (2cos(x+1))(cos(x-1)) = 0. Set both to zero to get cos(x) = -1/2 and 1. Solve to get x = 2π/3 and 4π/3.

The answer is 150°. Steps: Remember that arccos has a range of 0° ≤ y ≤ 180°. Next, we can rearrange the problem to look like this: cos(x)= -√3/2. Now, we recall our reference angles to find the answer.