1. What is the Altitude of Right Angled Triangle?

The Altitude of Right Angled Triangle is the length of the vertical distance from the hypotenuse to the vertex formed by joining the base and height of the Right Angled Triangle. It represents the shortest distance from the right angle vertex to the hypotenuse.

2. How Does the Calculator Work?

The calculator uses the altitude formula:

Where:

• \( Height \) — Height of the right angled triangle (m)
• \( Base \) — Base of the right angled triangle (m)

Explanation: The formula calculates the altitude by taking the product of the height and base, divided by the length of the hypotenuse.

3. Importance of Altitude Calculation

Details: Calculating the altitude of a right angled triangle is important in various geometric applications, construction projects, and engineering designs where precise measurements are required.

4. Using the Calculator

Tips: Enter both height and base values in meters. All values must be positive numbers greater than zero for accurate calculation.

5. Frequently Asked Questions (FAQ)

Q1: What units should I use for the inputs?
A: The calculator accepts any consistent units, but outputs in the same units. For best results, use meters as specified.

Q2: Can this calculator handle decimal values?
A: Yes, the calculator accepts decimal values with up to 4 decimal places for precise calculations.

Q3: What if I get an error message?
A: Ensure both height and base values are positive numbers greater than zero. Negative values or zero are not valid inputs.

Q4: How accurate is the calculation?
A: The calculator provides results with 6 decimal places precision, which is sufficient for most practical applications.

Q5: Can I use this for non-right angled triangles?
A: No, this formula is specifically designed for right angled triangles only.