Question #0280a

1 Answer
Douglas K.
Oct 1, 2016

#sin(theta) = (6sqrt52)/52#, #cos(theta) = (-4sqrt52)/52#, #sec(theta) = -sqrt52/4#, #csc = sqrt(52)/6# and #cot(theta) = -4/6#

Explanation:

The cotangent is the reciprocal of the tangent:

#cot(theta) = -4/6#

Use #1 + tan^2(theta) = sec^2(theta)# to obtain the secant and the cosine; we know that both the secant and the cosine must be negative because we are given #sin(theta) > 0#

#1 + ((-6)/4)^2 = sec^2(theta)#

#sec^2(theta) = 16/16 + 36/16#

#sec^2(theta) = 52/16#

#sec(theta) = -sqrt52/4#

#cos(theta) = (-4sqrt52)/52#

#sin(theta) = (-6/4)cos(theta)#

#sin(theta) = (6sqrt52)/52#

#csc = sqrt(52)/6#

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