How do you simplify $f(theta)=cot(theta/4)-tan(theta/2+pi/2)$ to trigonometric functions of a unit $theta$ ?

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Answer 1 · 2017-03-01T13:31:16

$f(theta)=cot(theta/4)-tan(theta/2+pi/2)=sqrt(2/(1-costheta))$

As $tan(90^@+A)=-cotA$ , $tan(theta/2+pi/2)=-cot(theta/2)$

Hence $f(theta)=cot(theta/4)-tan(theta/2+pi/2)$

= $cot(theta/4)-cot(theta/2)$

Further $cot(A/2)=cos(A/2)/sin(A/2)=(2cos^2(A/2))/(2sin(A/2)cos(A/2)$

= $(1+cosA)/sinA=cscA+cotA$

Also $sin(A/2)=sqrt((2sin^2(A/2))/2)=sqrt((1-(1-2sin^2(A/2)))/2)$

= $sqrt((1-cosA)/2)$ .......................(A)

Hence, $cot(theta/4)-cot(theta/2)$

= $csc(theta/2)+cot(theta/2)-cot(theta/2)$

= $csc(theta/2)$

= $1/sin(theta/2)$

= $sqrt(2/(1-costheta))$ (using (A))

How do you simplify f(theta)=cot(theta/4)-tan(theta/2+pi/2)f(theta)=cot(theta/4)-tan(theta/2+pi/2) to trigonometric functions of a unit thetatheta?