find the minimum valve of cos²x-cosec²x
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Answe.Here, we have to find out the least value of f(x)=cos²x+sec²x
Now,
{cos(x) - 1/cos(x)}² ≥ 0
(Since, all the squares are always positive/non-negative.)
=> cos²x + 1/cos²x - 2 × cos(x) × 1/cos(x) ≥ 0
=> cos²x + sec²x - 2 ≥ 0
{Since, sec(x) is the reciprocal of cos(x)}
=> cos²x + sec²x ≥ 2
Therefore, f(x)=cos²x+sec²x ∈ (2,∞)
Hence, the least value of f(x)=cos²x+sec²x is “2”.
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