sin(x + 1) sin(x + 1) − sin(x + 2) sin(x) = sin2 (1)

Prove the following (4 sin(θ) cos(θ))(1 − 2 sin2 (θ)) = sin(4θ) cos(2θ) /1 + sin(2θ)...

Prove the following (4 sin(θ) cos(θ))(1 − 2 sin2 (θ)) = sin(4θ) cos(2θ) /1 + sin(2θ) = cot(θ) − 1/ cot(θ) + 1 cos(u) /1 + sin(u) + 1 + sin(u) /cos(u) = 2 sec(u)

1. Differentiate the functions: a) f(x)=tan(1/x). b) f(x)=sin(x^2)sin^2(x).

1. Differentiate the functions: a) f(x)=tan(1/x). b) f(x)=sin(x^2)sin^2(x).

1. Calculate sin (x + y) when sin (x) = 0.20 (0 < x < π/2)...

1. Calculate sin (x + y) when sin (x) = 0.20 (0 < x < π/2) and sin (y) = 0.60 (π/2 < y< π) . 2. Find two vectors that have the same magnitude and are perpendicular to 3i + 5j 3. Two vectors are given by a = 3i + 2j and b = −i + 5j. Calculate the vector product of axb.

Find the derivative of the function. y = [x + (x + sin2(x))4]6

Find the derivative of the function. y = [x + (x + sin2(x))4]6

Solve for −?≤?≤?. (a) cos x – sin x = 1 (b) sin 4x – sin...

Solve for −?≤?≤?. (a) cos x – sin x = 1 (b) sin 4x – sin 2x=0 (c) cos x−√3sin ? = 1

Integrate the following: 1. 1/(x^2 + x - 2 ) dx 2. sin^2(5teta) 3. sinxcosx

Integrate the following: 1. 1/(x^2 + x - 2 ) dx 2. sin^2(5teta) 3. sinxcosx

The function sin2(2?x/L) is a periodic function of x (L is some fixed length). What is...

The function sin2(2?x/L) is a periodic function of x (L is some fixed length). What is the period? Show explicitly using a trig identity that this can be written as a Fourier cosine series. In this case there are only two nonzero terms in the series.

1. Let ?(?)=8(sin(?))? find f′(2). 2. Let ?(?)=3?sin−1(?) find f′(x) and f'(0.6).

1. Let ?(?)=8(sin(?))? find f′(2). 2. Let ?(?)=3?sin−1(?) find f′(x) and f'(0.6).

1a.) Find the linearization of the function f(x) = (sin x+1)^2 at a = 0. 1b.)...

1a.) Find the linearization of the function f(x) = (sin x+1)^2 at a = 0. 1b.) Differentiate the two functions below. f(x) = ln(e^x - sin x) ; g(x) = e^-x^2

Find sin(x/2), cos(x/2), and tan(x/2) from the given information. Sin(x) = 24/25, 0° < x <...

Find sin(x/2), cos(x/2), and tan(x/2) from the given information. Sin(x) = 24/25, 0° < x < 90°