sec(π/2-x)
To simplify the expression sec(π/2 – x), we can use the trigonometric identity:
sec(π/2 – A) = 1/cos(A)
Applying this identity to our expression, we have:
sec(π/2 – x) = 1/cos(x)
Therefore, the simplified form of sec(π/2 – x) is 1/cos(x)
To simplify the expression sec(π/2 – x), we can use the trigonometric identity:
sec(π/2 – A) = 1/cos(A)
Applying this identity to our expression, we have:
sec(π/2 – x) = 1/cos(x)
Therefore, the simplified form of sec(π/2 – x) is 1/cos(x).
We can also explain the steps involved in this simplification process:
1. Start with the given expression sec(π/2 – x).
2. Recognize the trigonometric identity, sec(π/2 – A) = 1/cos(A).
3. Substitute x for A, which gives us sec(π/2 – x) = 1/cos(x).
4. Therefore, the simplified form of sec(π/2 – x) is 1/cos(x).
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