正割计算器

How This Cosine Ratio Calculator Works

正割计算器是一款用于通过直角三角形的斜边和邻边长度来计算正割 (secant) 值的工具。sec(A) 是余弦的倒数，通过将斜边除以邻边来求得。

Formula

The cosine of angle A equals the adjacent side divided by the hypotenuse. This is the CAH in SOH-CAH-TOA.

The adjacent side b is the leg that touches angle A and the right angle. The hypotenuse c sits across from the right angle and is always the longest side. Because the hypotenuse is longer than any leg, cos(A) always produces a value between 0 and 1 for acute angles.

How to Use

1. Locate angle A in your right triangle. It is one of the two acute angles.
2. Identify the adjacent side. This is side b: the leg that forms angle A together with the hypotenuse.
3. Identify the hypotenuse c, the side opposite the 90° angle.
4. Enter the value of b in the first field.
5. Enter the value of c in the second field.
6. Press Calculate to see cos(A).
7. Check that the result is between 0 and 1.

Step-by-Step Example

A right triangle has adjacent side b = 4 and hypotenuse c = 5.

Cosine of angle A is 0.8. The adjacent side is 80% of the hypotenuse length. To find the angle: A = arccos(0.8) ≈ 36.87°.

What the Result Means

Cosine tells you how much of the hypotenuse length is covered by the adjacent side. A cosine of 0.8 means the adjacent side stretches 80% as far as the hypotenuse does.

When angle A is small, the adjacent side is nearly as long as the hypotenuse, so cos(A) is close to 1. When angle A is large (near 90°), the adjacent side shrinks relative to the hypotenuse, pushing cos(A) toward 0.

The result is dimensionless. It does not matter whether your measurements are in feet, meters, or any other unit — cosine is a pure ratio.

When to Use This Ratio

Reach for this cosine ratio calculator when:

• You know the adjacent side and hypotenuse and need the cosine value.
• You are finding the horizontal component of a force, velocity, or displacement vector.
• You want to verify a trig value from a textbook or problem set.
• You are working on navigation or surveying problems that involve horizontal distances.
• You need cos(A) before computing another derived quantity, like secant or tangent.

Common Mistakes

These are the most frequent cosine errors students make:

• Using the opposite side instead of the adjacent side. Cosine uses the leg next to angle A, not the one across from it.
• Entering b larger than c. In a valid right triangle, the hypotenuse is always the longest side. If b exceeds c, your values do not form a right triangle.
• Reversing the fraction. Writing c / b gives the secant, not the cosine.
• Mixing the adjacent side with the hypotenuse label. Double-check which side is opposite the right angle (that is the hypotenuse) and which forms part of angle A (that is the adjacent side).
• Using side lengths measured in different units without converting first.