Login or Sign Up

Ask a New Question

x= arccos(-√2/2) - cos(arcsin√5/3)

working from your last problem, this is just 3π/4 - 2/3

Similar Questions

Find the exact value of cot(arcsin(12/13))and cos(arcsin(1.7/2)) I know that cos(arcsin(x))=sin(arccos(x))=sqrt(1-x^2). I'm

Top answer: I got the second answer. Still confused on the first one. Read more.
Problem:cos[arccos(-sqrt3/2)-arcsin(-1/2)] This is what I have: cos [(5pi/6)-(11pi/6)] cos (-6pi/6) or -pi giving an answer of

Top answer: I would use the smaller angle. It should not matter on the final answer. Read more.
Please can you help me with this question?Choose the option which is a false statement: A arctan(tan2/3pi))=-1/3pi B

Top answer: The right-hand-side of all the answers are in terms of π, typically for angles. The left-hand-sides Read more.
Evaluate please:a.) arcsin(sin 13pi/16) b.) arccos(cos[-pi/18]) c.) arcsin(sin pi/18 d.) arcsec(-√2) e.) arctan(-√3/3)

Top answer: a) isn't arcsin(sin(?)) the inverse of itself? so 13π/16 b) and c) same thing, except by definition Read more.
PLEASE HELP!!Solve: 1. cos(arcsin(4/5))= ?? 2. tan(arccos(4/5))= ?? 3. cos(arctan(3))= ?? Note: Give exact answers!!

Top answer: Let's first understand what this kind of question means. I will do the 3rd one cos(arctan(3)) Read more.
Book works out integral of sqtr(a^2-x^2)dx as a^2/2*arcsin(x/a)+x/2*sqrt(a^2-x^2) by taking x=a sin theta, and advises to work

Top answer: Don't forget the constants of integration. ------------- A = ∫ √(a<sup>2</sup>-x<sup>2</sup>) dx Read more.
solve for x in the following equations:1) sin(arcsin x) = 1 2) 2arcsin x = 1 3) cos(arccos x) = 1/3

Top answer: think of the definition of inverse trig functions arcsin x is the angle Ø so that sinØ = x so let Read more.
y=arccos(sin(x)), find dy/dx and sketch it's graph(I guess I can do this on wolframalpha after I'm done solving the question).

Top answer: whenever you have problems like this, draw a right triangle. In this case, you want a triangle with Read more.
Suppose f(x) = sin(pi cos(x)). On any interval where the inverse function y = f^-1(x) exists, the derivative of f^-1(x) with

Top answer: your expression for y is right. so, Let u = 1/pi arcsinx (arccos u)' = -1/sqrt(1-u^2) u' = Read more.
Evaluate.1. sin^-1(-1/2) 2. cos^-1[(-root 3)/2] 3. arctan[(root3)/3] 4. cos(arccos2/3) 5. arcsin(sin 2pi) 6. sin(arccos 1)

Top answer: I will be happy to critique your thinking or work. Read more.