Question: continue the explanation and start from Step 3: Integrate The integral of (sectheta) is (ln|sectheta + tantheta|). So, we have: [ frac{1}{2} int sectheta dtheta

continue the explanation and start from Step 3: Integrate The integral of (\sec\theta) is (\ln|\sec\theta + \tan\theta|). So, we have: [ \frac{1}{2} \int \sec\theta d\theta = \frac{1}{2} \ln|\sec\theta + \tan\theta| + C ]

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