AP EAMCET · Maths · Vector Algebra
Let \(P\) be a real number and \(|P| \geq 2\). If \(A, B, C\) are variable angles such that
\[
\left(\sqrt{P^2-4}\right) \tan A+P \tan B+\left(\sqrt{P^2+4}\right) \tan C=6 P \text {, }
\]
then the minimum value of
\[
\tan ^2 A+\tan ^2 B+\tan ^2 C=
\]
- A 6
- B 8
- C 12
- D 18
Answer & Solution
Correct Answer
(C) 12
Step-by-step Solution
Detailed explanation
Let \(\mathbf{a}=\sqrt{P^2-4} \hat{i}+P \hat{j}+\sqrt{P^2+4} \hat{k}\) and \(\mathbf{b}=\tan A \hat{i}+\tan B \hat{j}+\tan C \hat{k}\) are two vector expression \(\mathbf{a} \cdot \mathbf{b}=\sqrt{P^2-4} \tan A+P \tan B+\sqrt{P^2+4} \tan C\)…
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