Name the Quadrant 1. cot q = -3 , tan q = 2. cot q =...

Find the values of sin x, tan x, cot x, sec x, and csc x and...

Find the values of sin x, tan x, cot x, sec x, and csc x and cos x given that cos(2x)=(3/5) and 3 π /2 < 2x <2 π

1.Suppose a = 10 and b = 9. Find an exact value or give at least...

1.Suppose a = 10 and b = 9. Find an exact value or give at least two decimal places: sin(A) = cos(A) = tan(A) = sec(A) = csc(A) = cot(A) = 2. Suppose a = 8 and b = 3. Find an exact value or give at least two decimal places: sin(A) = cos(A) = tan(A) = sec(A) = csc(A) = cot(A) =

1) Completely simplify 2) Write the expression cot( in terms of x and y only 3)...

1) Completely simplify 2) Write the expression cot( in terms of x and y only 3) If csc x = 2 and x is in Q I, determine the exact values of sin x and cos x. 4) Use a sum to product formula to rewrite sin 2x – sin 5x as the product of two trig functions. Step by Step please 5) Use a product to sum formula to rewrite sin(2x) * sin(5x) as a sum of two trig...

1) Find the values of the trigonometric functions of θ from the information given. cot(θ) =...

1) Find the values of the trigonometric functions of θ from the information given. cot(θ) = − 3/5, cos(θ) > 0 sin(θ) = cos(θ) = tan(θ) = csc(θ) = sec(θ) = 2) The point P is on the unit circle. Find P(x, y) from the given information. The x-coordinate of P is −√5/4, and P lies below the x-axis. P(x, y) = ( ) 3) Find the terminal point P(x, y)  on the unit circle determined by the given value of...

A) Prove the trigonometric identity (tan x + 2)^2 = sec^2 x + 4 tan x...

A) Prove the trigonometric identity (tan x + 2)^2 = sec^2 x + 4 tan x + 3 B) Use a sum-to-product identities to show that cos(x + y) cos x cos y = 1 − tan x tan y. C) Write the product as a sum Sin12xSin4x

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)

Find the derivative of the functions y=cot-1(1/x^2+1) y=(cos-1x)^2 y=tan-1(x^2sinx^3) y= In(1/1+x^2) y=(In(1+x^5))^2 y=(cos(x^2+1)^7

Find the derivative of the functions y=cot-1(1/x^2+1) y=(cos-1x)^2 y=tan-1(x^2sinx^3) y= In(1/1+x^2) y=(In(1+x^5))^2 y=(cos(x^2+1)^7

3.5.2a. If csc(θ)=3 and (π/2) <?θ< ?π ( signs are less than and equal to) find...

3.5.2a. If csc(θ)=3 and (π/2) <?θ< ?π ( signs are less than and equal to) find the following and give exact answers: (a.) sin(θ) (b.) cos(θ) (c.) tan(θ) (d.) sec(θ) (e.) cot(θ)

1. Use the given conditions to find the exact value of the expression. sin(α) = -5/3,...

1. Use the given conditions to find the exact value of the expression. sin(α) = -5/3, tan(α) > 0, sin(α - 5π/3) 2. Use the given conditions to find the exact value of the expression. cos α = 24/25, sin α < 0, cos(α + π/6) 3. Use the given conditions to find the exact value of the expression. cot x = √3, cos x < 0, tan(x + π/6) 4. If α and β are acute angles such that...

PLEASE SOLVE ALL 8 QUESTIONS SHOWING STEP-BY-STEP SOLUTIONS. Solve for the unknown variable on the interval...

PLEASE SOLVE ALL 8 QUESTIONS SHOWING STEP-BY-STEP SOLUTIONS. Solve for the unknown variable on the interval 0 is (less than or equal to) x (less than or equal to) 2pi. 1. 4 cos^2 x - 3 =0 2. Square root of 2 sin 2x = 1 3. 3cot^2 x-1 = 0 4. cos^3 x = cos x 5. sin x - 2sin x cos x = 0 6. 2sin^2 x- sin x-3 = 0 7. csc^2 x- csc x -...