simplify (cos2x-sin2x)(cos^2x+sec^2x+1)

Which of the following is identical to (sin2x / sinx) - (cos2x / cosx) a. sin^2x...

Which of the following is identical to (sin2x / sinx) - (cos2x / cosx) a. sin^2x b. cos^2x c. sec^2x d. csc^2x e. none of these

1. Find lim x-0. tan4x/sin5x 2. Find and simplify ?/(?) ?? ?(?) = 1-cos(?)/1+cos(?)

1. Find lim x-0. tan4x/sin5x 2. Find and simplify ?/(?) ?? ?(?) = 1-cos(?)/1+cos(?)

Simplify cos(3cos-1(x)) and cos(4cos-1(x)). These are Chebyshev polynomials of order 3 and 4 respectively.

Simplify cos(3cos-1(x)) and cos(4cos-1(x)). These are Chebyshev polynomials of order 3 and 4 respectively.

Determine if the set of functions is linearly independent: 1. f1(x)=cos2x, f2(x)=1, f3(x)=cos^2 x 2. f1(x)=e^...

Determine if the set of functions is linearly independent: 1. f1(x)=cos2x, f2(x)=1, f3(x)=cos^2 x 2. f1(x)=e^ x, f2(x)=e^-x, f3(x)=senhx

3.2) If a(t)=<-1/(t+1)^2, sec^3 t+ tan^2 t sec t,-t sin t+ 2 cos t- 2> represents...

3.2) If a(t)=<-1/(t+1)^2, sec^3 t+ tan^2 t sec t,-t sin t+ 2 cos t- 2> represents the acceleration of a particle at time t with v(0)=〈2,-1, 0〉 and r(0)=〈0, 2, 0〉 then find the distance from the the particle to the plane 2x- 3y+z= 10 at t= 1 (ie Find the Distance from the particle to the Plane)

Solve the following equations over the interval [0,2pi) a) 3tan^2x-9=0 b) 2cos3x=1 c) sin2x=cosx d) 2sin^2-3sinx+1=0

Solve the following equations over the interval [0,2pi) a) 3tan^2x-9=0 b) 2cos3x=1 c) sin2x=cosx d) 2sin^2-3sinx+1=0

Simplify cos ( 4 w ) − cos ( 2 w ) sin ( 4 w...

Simplify cos ( 4 w ) − cos ( 2 w ) sin ( 4 w ) + sin ( 2 w ) to an expression involving a single trigonometric function.

Verify that the functions y1 = cos x − cos 2x and y2 = sin x...

Verify that the functions y1 = cos x − cos 2x and y2 = sin x − cos 2x both satisfy the differential equation y′′ + y = 3 cos 2x.

Write the binomial expansion of (2x-3y)^5 and simplify.

Write the binomial expansion of (2x-3y)^5 and simplify.

Find the value of C > 0 such that the function ?C sin2x, if0≤x≤π, f(x) =...

Find the value of C > 0 such that the function ?C sin2x, if0≤x≤π, f(x) = 0, otherwise is a probability density function. Hint: Remember that sin2 x = 12 (1 − cos 2x). 2. Suppose that a continuous random variable X has probability density function given by the above f(x), where C > 0 is the value you computed in the previous exercise. Compute E(X). Hint: Use integration by parts! 3. Compute E(cos(X)). Hint: Use integration by substitution!