What is the crosswind component for a Rwy 13 landing when the surface wind is 180° at 27 knots?

Unlock all questions

This demo includes only 20 questions. Upgrade to access hundreds of questions, flashcards, exam simulations, and disable ads.

Full question bankExam simulationsFlashcards
From $9.99Unlock all

Prepare for the Commercial Pilot Airplane (CAX) Exam with calculations quizzes that challenge your knowledge. Familiarize yourself with multiple choice questions, detailed explanations, and increase your confidence to pass with flying colors!

Multiple Choice

What is the crosswind component for a Rwy 13 landing when the surface wind is 180° at 27 knots?

Explanation:
To determine the crosswind component when landing on Runway 13 with a wind direction of 180° at 27 knots, it's essential to understand the relationship between wind direction, runway orientation, and how to calculate the crosswind component. Runway 13 is oriented at 130° from true north. A wind coming from 180° is directly from the south, which means it is aligned with the runway's approach direction but not perpendicular to it. To find the crosswind component, we can use the formula: Crosswind Component = Wind Speed × sin(angle) First, we need to find the angle between the wind direction and the runway orientation. The angle can be determined as follows: - Wind direction = 180° - Runway direction = 130° - Angle = 180° - 130° = 50° Now, we apply the wind speed: 1. The wind speed is 27 knots. 2. We calculate the sin(50°) since it is the value we need for the calculation. Using a calculator or trigonometric tables, we find that sin(50°) is approximately 0.7660. Now we can compute the crosswind component: Crosswind Component = 27 knots

To determine the crosswind component when landing on Runway 13 with a wind direction of 180° at 27 knots, it's essential to understand the relationship between wind direction, runway orientation, and how to calculate the crosswind component.

Runway 13 is oriented at 130° from true north. A wind coming from 180° is directly from the south, which means it is aligned with the runway's approach direction but not perpendicular to it. To find the crosswind component, we can use the formula:

Crosswind Component = Wind Speed × sin(angle)

First, we need to find the angle between the wind direction and the runway orientation. The angle can be determined as follows:

  • Wind direction = 180°

  • Runway direction = 130°

  • Angle = 180° - 130° = 50°

Now, we apply the wind speed:

  1. The wind speed is 27 knots.

  2. We calculate the sin(50°) since it is the value we need for the calculation.

Using a calculator or trigonometric tables, we find that sin(50°) is approximately 0.7660.

Now we can compute the crosswind component:

Crosswind Component = 27 knots

More Multiple Choice Questions
Subscribe

Get the latest from Examzify

You can unsubscribe at any time. Read our privacy policy