find the amplitude of y= -4 sin (3x + pie). find the period of y= 3csc...

(a) Rewrite the expression as an algebraic expression in x tan(sin-1(x)) (b) Find sin(2x), cos(2x) and...

(a) Rewrite the expression as an algebraic expression in x tan(sin-1(x)) (b) Find sin(2x), cos(2x) and tan (2x) from the given information csc(x)=4, tan(x)<0

Determine the amplitude, the period and the phase shift of the function 1.  y = 1/3 cos...

Determine the amplitude, the period and the phase shift of the function 1.  y = 1/3 cos ( -3 x ) + 1 2. y =   cos ( - 2 PIE x ) + 2 3. y = ½ sin (2 PIE x + PIE ) 4. y = - ¼ cos (PIE x - 4 ) 5. y = 2 sin (2 PIE x + 1 ) 6. y = ½ sin ( 2 x - PIE/4 )

Use the cofunction identities to find an angle theta that makes the statement true. 1) sin(...

Use the cofunction identities to find an angle theta that makes the statement true. 1) sin( 3theta - 17degrees)=cos (theta+43degrees) 2) cot 5theta= tan 4theta Use identities to write the expression as a single function of x or theta. 1) cos (theta - pi) Verify that the equation is an identity. 1) sin (x+y)-sin(x-y)=2 cos x sin y

Without using a calculator, find y' for the function: y = sin-1 (3x)+ln(x)sinh(3x)+ (2x−1)/sqrt(5x+1)

Without using a calculator, find y' for the function: y = sin-1 (3x)+ln(x)sinh(3x)+ (2x−1)/sqrt(5x+1)

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

Differentiate the function y=ln(e-x +xe-x) Find y and y" y=ln(sec(3x)+tan(3x)) Use logarithmic differentiation to find the...

Differentiate the function y=ln(e-x +xe-x) Find y and y" y=ln(sec(3x)+tan(3x)) Use logarithmic differentiation to find the derivative of the function. y=(cos(9x))x Use logarithmic differentiation to find the derivative of the function. y=(sin(9x))(lnx)

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) =

9. Suppose that tan(alpha)=3/4 and pi<alpha<3pi/2. Find: a)sin(2alpha), b)cos(2alpha). 10. Suppose that tan(alpha)=-3 and 3pi/2<alpha<2pi. Find:...

9. Suppose that tan(alpha)=3/4 and pi<alpha<3pi/2. Find: a)sin(2alpha), b)cos(2alpha). 10. Suppose that tan(alpha)=-3 and 3pi/2<alpha<2pi. Find: a)sin(2alpha), b)cos(2alpha). 16. Given theta is an acute angle with cos(theta)=1/4 , find the value of tan(theta/2)+tan(2theta). Hint: Find each (using half angle or double angle formulas) and add them up.

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...

Calculate the higher derivatives. y = tan(x) y'' =    y''' = If f(x) = sin(x)...

Calculate the higher derivatives. y = tan(x) y'' =    y''' = If f(x) = sin(x) and g(x) = cos(x), determine the following.      f (4n + 1)(x) =      g(4n + 1)(x) =      f (4n + 2)(x) = g(4n + 2)(x) =      f (4n + 3)(x) = g(4n + 3)(x) =      f (4n + 4)(x) = g(4n + 4)(x) = Now, use your answers to calculate F(159)(x) when F(x) = 4 sin(x) + 3 cos(x). F(159)(x)...