Quiz: Understanding Right Triangle and Trigonometric Relationships — 5 Fragen

Detaillierte Fragen und Antworten

1. If in a right triangle, the measure of an angle x satisfies sin x = 1/3, which of the following expressions involving cosine is equal to 1/3?

cos x
cos(90° - x)
cos(x - 45°)
cos(60° - x)

cos(90° - x)

Erklärung

Since sin x = 1/3, the cosine of the complementary angle, which is 90° - x, equals sin x, by the co-function identity cos(90° - x) = sin x. Therefore, cos(90° - x) = 1/3. The other options involve shifted angles, but without additional information or calculation, only cos(90° - x) is guaranteed to be 1/3 based on the complementary relationship.

2. What fundamental property characterizes the sine of angle x in a right triangle?

Sine of x equals the cosine of the complementary angle (90° - x).
Sine of x is the ratio of the opposite side to the hypotenuse.
Sine of x is the ratio of the adjacent side to the hypotenuse.
Sine of x is always less than 1 in a right triangle.

Sine of x is the ratio of the opposite side to the hypotenuse.

Erklärung

The sine of angle x in a right triangle is defined as the ratio of the length of the side opposite to x to the hypotenuse, which is the fundamental property of the sine function in right triangles.

3. Which of the following best describes the meaning of the expression cos(90° - x) in relation to sin x?

It is the same as sin x, representing the sine of the same angle.
It is the cosine of an angle shifted by 90°, unrelated to sin x.
It is the tangent of the angle x, derived from sine and cosine.
It is the cosine of the complement of x, equal to sin x in value.

It is the cosine of the complement of x, equal to sin x in value.

Erklärung

The expression cos(90° - x) is the cosine of the complement of x, which is equal to sin x by the co-function identity. Since sin x = 1/3, cos(90° - x) also equals 1/3. This is a fundamental identity connecting sine and cosine of complementary angles.

4. How does the cosine of x compare to the cosine of the shifted angle (90° - x)?

Cos x and cos(90° - x) are unrelated
Cos x is always greater than cos(90° - x)
Cos x is equal to cos(90° - x)
Cos x is always less than cos(90° - x)

Cos x is equal to cos(90° - x)

Erklärung

The cosine of x and the cosine of (90° - x) are related through the identity cos(90° - x) = sin x. Since sin x = 1/3, it follows that cos(90° - x) equals 1/3. The value of cos x depends on x itself, but the key point is that cos(90° - x) is directly equal to sin x, which is 1/3. Thus, the comparison highlights the identity that these two are equal in value, making option 1 correct.

5. What is the main purpose of analyzing the cosine of shifted angles such as (x - 45°), (45° - x), or (90° - x) in the context of trigonometry?

To find the degrees of angles in non-right triangles
To determine the exact lengths of sides in a right triangle
To measure angles more precisely in geometric constructions
To establish direct relationships between different trigonometric functions for simplified calculations

To establish direct relationships between different trigonometric functions for simplified calculations

Erklärung

The purpose of analyzing cosine of shifted angles is to utilize identities that relate sine and cosine of these angles, simplifying calculations and understanding their interdependence. For example, cos(90° - x) equals sin x, which helps in solving problems involving complementary angles. The other options do not accurately describe the primary role of studying shifted cosine functions.

Mit Karteikarten lernen

Merke dir die Antworten mit 10 Karteikarten zu Understanding Right Triangle and Trigonometric Relationships.

Right triangle — angle measure?

Non-right angles sum to 90°.

Sine of x — ratio?

Opposite over hypotenuse.

Expressions equal to 1/3?

cos(90° - x) equals 1/3.

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