Calculate sec(θ) = 1/cos(θ) in degrees, radians, or gradians. All 6 trig functions, identity verification, asymptote warnings, sign chart, and common values.
The **Secant Calculator** evaluates sec(θ) = 1/cos(θ) for any angle in degrees, radians, or gradians. It provides a complete trigonometric breakdown: all six standard functions (sin, cos, tan, cot, sec, csc) are computed simultaneously, and the Pythagorean identity sec²θ = 1 + tan²θ is verified numerically to confirm consistency.
When the input angle is an odd multiple of 90° — where cos(θ) = 0 — the calculator displays a clear asymptote warning instead of producing misleading results. A quadrant-sign visual grid shows at a glance where sec is positive (Quadrants I and IV) and where it is negative (Quadrants II and III), with the current quadrant highlighted.
A key identities table lists six fundamental secant relationships, each verified with the current angle's computed values. The common-values table covers 17 standard angles from 0° to 360° in 30° and 45° steps, showing both the exact algebraic form and the decimal approximation. The closest match to the current input is highlighted for quick cross-referencing.
A dedicated domain-restrictions table lists the vertical asymptotes of sec(θ) around the input, along with the general rule θ = 90° + 180°n. Eight preset buttons cover the most common angles. Adjustable precision from 0 to 12 decimal places and toggles for the reciprocal-functions section and identities section let you customize the output to your needs.
Secant Calculator — sec(θ) with Full Trig Breakdown helps you avoid repetitive setup mistakes when solving trigonometric and coordinate-geometry problems. Instead of recalculating conversions, signs, and edge cases by hand, you can test inputs immediately, inspect intermediate values, and confirm final answers before submitting work or using numbers in downstream calculations. It surfaces key outputs like sec(θ), cos(θ), sin(θ) in one pass.
sec(θ) = 1/cos(θ). Undefined when cos(θ) = 0 (at θ = 90° + 180°n). sec²θ = 1 + tan²θ (Pythagorean identity). sec(−θ) = sec(θ) (even function). Period = 360° = 2π.
Result: sec(60°) = 2, cos(60°) = 0.5, sin(60°) ≈ 0.8660, tan(60°) ≈ 1.7321
Using θ=60°, the calculator returns sec(60°) = 2, cos(60°) = 0.5, sin(60°) ≈ 0.8660, tan(60°) ≈ 1.7321. This example mirrors the calculator's live computation flow and is useful for checking manual steps and unit handling.
This calculator is tailored to secant calculator — sec(θ) with full trig breakdown workflows, including common input modes, unit handling, and special-case behavior. It is designed for fast checking during homework, exam preparation, technical drafting, and coding tasks where trigonometric consistency matters.
Use the primary result together with supporting outputs to verify direction, magnitude, and validity. Cross-check against known identities or geometric constraints, and confirm that angle ranges, sign conventions, and domain restrictions are satisfied before using the numbers elsewhere.
A reliable way to improve is to solve once manually, then verify with the calculator and explain any mismatch. Repeat this on varied examples and edge cases. The built-in preset scenarios for quick trials, comparison tables for side-by-side validation, visual cues that make trends and quadrants easier to read help you build pattern recognition and reduce sign or conversion errors over time.
Secant (sec) is the reciprocal of cosine: sec(θ) = 1/cos(θ). It is one of the six standard trigonometric functions and appears frequently in calculus, physics, and engineering.
sec(θ) is undefined whenever cos(θ) = 0, which happens at θ = 90° + 180°n for any integer n (equivalently, at odd multiples of π/2 in radians). Use this as a practical reminder before finalizing the result.
Because cos(θ) ranges from −1 to 1, its reciprocal 1/cos(θ) must be ≤ −1 or ≥ 1. Cosine can never exceed 1 in absolute value, so its reciprocal can never fall below 1 in absolute value.
Sec is an even function: sec(−θ) = 1/cos(−θ) = 1/cos(θ) = sec(θ), because cosine itself is even. Keep this note short and outcome-focused for reuse.
sec²θ = 1 + tan²θ. This is derived from dividing sin²θ + cos²θ = 1 by cos²θ. The calculator verifies this identity numerically for your input.
The derivative of sec(θ) with respect to θ is sec(θ)·tan(θ). The integral of sec(θ) is ln|sec(θ) + tan(θ)| + C.