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Write tan(cos^-1(- x/5)) as an algebraic Expression in terms of X. ?
Write the given expression as an algebraic expression in x. cos(2 tan-1(x))
Write the expression in terms of sines and/or cosines, and then simplify. cot x sin x-tan x COS X 1 sin x cos x 1 sin x cos2x sin x + cos x sin x cos x COS X - sin X
for what values of x is the expression tan(x)/(1-2(cos^2)(x)) defined?
Find the derivative of each one. a. y = (tan(x2 + 1))4 + 5 In Vx b. с. У-(sin x)cos x a. y = (tan(x2 + 1))4 + 5 In Vx b. с. У-(sin x)cos x
3. Use a labeled reference triangle to evaluate tan (cos-1 (cos** (33)) in terms of x. Show triangle for credit.
Write the expression in terms of sines and/or cosines, and then simplify. 5) sec2x+sin2x 1 + cos2x A) B) 1 +sin x cos x cos2x COS X 1+ sin2 x cos2x C) sinx D) cos2x 6) cotx sin x-tan x cos x A) cos x - sinx 1 B) 1 sin x cos x C) D) sin x + COS X sin x cos x sin x cos2x
write tan[ arccos(x) ] as an algebraic expression in x, given x >0
Find sin(2x), cos(2x), and tan(2x) from the given information. tan(x) = ) = - cos(x) > 0 sin(2x) = cos(2x) = tan(2x) =
If •dt, then Vtant g'(x)= a) cos x 1 w b) tan x c) 2v tan x d) cosx
verify algebraically cos(-x) -= sec x + tan x 1+ sin(-x) tan x + cotx=sec X CSC X