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Use a Pythagorean identity to find [tex]\(\sec(\theta)\)[/tex] if [tex]\(\tan(\theta) = 2\)[/tex] and the terminal side of [tex]\(\theta\)[/tex] lies in quadrant II.

[tex]\(\sec(\theta) =\)[/tex]

[tex]\(\boxed{\phantom{answer}}\)[/tex]

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To find [tex]\(\sec(\theta)\)[/tex] given that [tex]\(\tan(\theta) = 2\)[/tex] and [tex]\(\theta\)[/tex] lies in Quadrant II, we can use a Pythagorean identity and follow a detailed step-by-step approach.

1. Use the Pythagorean identity: The identity relating [tex]\(\tan(\theta)\)[/tex] and [tex]\(\sec(\theta)\)[/tex] is:
[tex]\[ 1 + \tan^2(\theta) = \sec^2(\theta) \][/tex]

2. Substitute the given value: We are given that [tex]\(\tan(\theta) = 2\)[/tex]. Substitute this value into the identity:
[tex]\[ 1 + (2)^2 = \sec^2(\theta) \][/tex]

3. Simplify:
[tex]\[ 1 + 4 = \sec^2(\theta) \][/tex]
[tex]\[ \sec^2(\theta) = 5 \][/tex]

4. Solve for [tex]\(\sec(\theta)\)[/tex]: To find [tex]\(\sec(\theta)\)[/tex], take the square root of both sides:
[tex]\[ \sec(\theta) = \pm\sqrt{5} \][/tex]

5. Determine the sign based on the quadrant: Since [tex]\(\theta\)[/tex] is in Quadrant II, we know that [tex]\(\cos(\theta)\)[/tex] is negative (since cosine is negative in the second quadrant). Consequently, [tex]\(\sec(\theta)\)[/tex], which is the reciprocal of [tex]\(\cos(\theta)\)[/tex], will also be negative.

Putting it all together, we have:
[tex]\[ \sec(\theta) = -\sqrt{5} \][/tex]

Therefore, the exact, fully simplified answer is:
[tex]\[ \sec(\theta) = -\sqrt{5} \][/tex]
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