Median Line on Height of Right Angled Triangle Calculator

✖The Base of Right Angled Triangle is the length of the base leg of the Right Angled Triangle, adjacent to the perpendicular leg.ⓘ Base of Right Angled Triangle [B]			+10% -10%
✖The Height of Right Angled Triangle is the length of the perpendicular leg of the Right Angled Triangle, adjacent to the base.ⓘ Height of Right Angled Triangle [h]			+10% -10%

✖Median on Height of Right Angled Triangle is a line segment joining the midpoint of the height to its opposite vertex.ⓘ Median Line on Height of Right Angled Triangle [M_h]

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Median Line on Height of Right Angled Triangle Solution

STEP 0: Pre-Calculation Summary

Formula Used

Median on Height of Right Angled Triangle = sqrt(2*(2*Base of Right Angled Triangle^2+Height of Right Angled Triangle^2)-Height of Right Angled Triangle^2)/2
M_h = sqrt(2*(2*B^2+h^2)-h^2)/2
This formula uses 1 Functions, 3 Variables

Functions Used

sqrt - A square root function is a function that takes a non-negative number as an input and returns the square root of the given input number., sqrt(Number)

Variables Used

Median on Height of Right Angled Triangle - (Measured in Meter) - Median on Height of Right Angled Triangle is a line segment joining the midpoint of the height to its opposite vertex.
Base of Right Angled Triangle - (Measured in Meter) - The Base of Right Angled Triangle is the length of the base leg of the Right Angled Triangle, adjacent to the perpendicular leg.
Height of Right Angled Triangle - (Measured in Meter) - The Height of Right Angled Triangle is the length of the perpendicular leg of the Right Angled Triangle, adjacent to the base.

STEP 1: Convert Input(s) to Base Unit

Base of Right Angled Triangle: 15 Meter --> 15 Meter No Conversion Required
Height of Right Angled Triangle: 8 Meter --> 8 Meter No Conversion Required

STEP 2: Evaluate Formula

Substituting Input Values in Formula

M_h = sqrt(2*(2*B^2+h^2)-h^2)/2 --> sqrt(2*(2*15^2+8^2)-8^2)/2

Evaluating ... ...

M_h = 15.52417469626

STEP 3: Convert Result to Output's Unit

15.52417469626 Meter --> No Conversion Required

FINAL ANSWER

15.52417469626 ≈ 15.52417 Meter <-- Median on Height of Right Angled Triangle

(Calculation completed in 00.004 seconds)

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Created by Mridul Sharma

Indian Institute of Information Technology (IIIT), Bhopal

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Vellore Institute of Technology (VIT), Bhopal

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< Median Line of Right Angled Triangle Calculators

Median Line on Hypotenuse of Right Angled Triangle

LaTeX Go Median on Hypotenuse of Right Angled Triangle = sqrt(2*(Height of Right Angled Triangle^2+Base of Right Angled Triangle^2)-Height of Right Angled Triangle^2-Base of Right Angled Triangle^2)/2

Median Line on Height of Right Angled Triangle

LaTeX Go Median on Height of Right Angled Triangle = sqrt(2*(2*Base of Right Angled Triangle^2+Height of Right Angled Triangle^2)-Height of Right Angled Triangle^2)/2

Median Line on Base of Right Angled Triangle

LaTeX Go Median on Base of Right Angled Triangle = sqrt(2*(2*Height of Right Angled Triangle^2+Base of Right Angled Triangle^2)-Base of Right Angled Triangle^2)/2

Median Line on Height of Right Angled Triangle given Hypotenuse and Height

LaTeX Go Median on Height of Right Angled Triangle = sqrt(4*Hypotenuse of Right Angled Triangle^2-3*Height of Right Angled Triangle^2)/2

< Important Formulas of Right Angled Triangle Calculators

Altitude of Right Angled Triangle

LaTeX Go Altitude of Right Angled Triangle = (Height of Right Angled Triangle*Base of Right Angled Triangle)/sqrt(Height of Right Angled Triangle^2+Base of Right Angled Triangle^2)

Circumradius of Right Angled Triangle given Sides

LaTeX Go Circumradius of Right Angled Triangle = (sqrt(Height of Right Angled Triangle^2+Base of Right Angled Triangle^2))/2

Hypotenuse of Right Angled Triangle

LaTeX Go Hypotenuse of Right Angled Triangle = sqrt(Height of Right Angled Triangle^2+Base of Right Angled Triangle^2)

Area of Right Angled Triangle

LaTeX Go Area of Right Angled Triangle = (Base of Right Angled Triangle*Height of Right Angled Triangle)/2

Median Line on Height of Right Angled Triangle Formula

LaTeX Go

Median on Height of Right Angled Triangle = sqrt(2*(2*Base of Right Angled Triangle^2+Height of Right Angled Triangle^2)-Height of Right Angled Triangle^2)/2
M_h = sqrt(2*(2*B^2+h^2)-h^2)/2

What is Right-Angled Triangle?

A right triangle or right-angled triangle, or more formally an orthogonal triangle, is a triangle in which one angle is a right angle. The relation between the sides and angles of a right triangle is the basis for trigonometry. The side opposite the right angle is called the hypotenuse.

What is a median?

The median of a triangle is a line drawn from one of the vertices to the mid-point of the opposite side. In the case of a right triangle, the median to the hypotenuse has the property that its length is equal to half the length of the hypotenuse.

How to Calculate Median Line on Height of Right Angled Triangle?

Median Line on Height of Right Angled Triangle calculator uses Median on Height of Right Angled Triangle = sqrt(2*(2*Base of Right Angled Triangle^2+Height of Right Angled Triangle^2)-Height of Right Angled Triangle^2)/2 to calculate the Median on Height of Right Angled Triangle, Median Line on Height of Right Angled Triangle formula is defined as the length of line segment from vertex formed by joining of base and hypotenuse of Right Angled triangle, to the opposite side that bisects it. Median on Height of Right Angled Triangle is denoted by M_h symbol.

How to calculate Median Line on Height of Right Angled Triangle using this online calculator? To use this online calculator for Median Line on Height of Right Angled Triangle, enter Base of Right Angled Triangle (B) & Height of Right Angled Triangle (h) and hit the calculate button. Here is how the Median Line on Height of Right Angled Triangle calculation can be explained with given input values -> 15.52417 = sqrt(2*(2*15^2+8^2)-8^2)/2.

FAQ

What is Median Line on Height of Right Angled Triangle?

Median Line on Height of Right Angled Triangle formula is defined as the length of line segment from vertex formed by joining of base and hypotenuse of Right Angled triangle, to the opposite side that bisects it and is represented as M_h = sqrt(2*(2*B^2+h^2)-h^2)/2 or Median on Height of Right Angled Triangle = sqrt(2*(2*Base of Right Angled Triangle^2+Height of Right Angled Triangle^2)-Height of Right Angled Triangle^2)/2. The Base of Right Angled Triangle is the length of the base leg of the Right Angled Triangle, adjacent to the perpendicular leg & The Height of Right Angled Triangle is the length of the perpendicular leg of the Right Angled Triangle, adjacent to the base.

How to calculate Median Line on Height of Right Angled Triangle?

Median Line on Height of Right Angled Triangle formula is defined as the length of line segment from vertex formed by joining of base and hypotenuse of Right Angled triangle, to the opposite side that bisects it is calculated using Median on Height of Right Angled Triangle = sqrt(2*(2*Base of Right Angled Triangle^2+Height of Right Angled Triangle^2)-Height of Right Angled Triangle^2)/2. To calculate Median Line on Height of Right Angled Triangle, you need Base of Right Angled Triangle (B) & Height of Right Angled Triangle (h). With our tool, you need to enter the respective value for Base of Right Angled Triangle & Height of Right Angled Triangle and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.

How many ways are there to calculate Median on Height of Right Angled Triangle?

In this formula, Median on Height of Right Angled Triangle uses Base of Right Angled Triangle & Height of Right Angled Triangle. We can use 2 other way(s) to calculate the same, which is/are as follows -

Median on Height of Right Angled Triangle = sqrt(4*Hypotenuse of Right Angled Triangle^2-3*Height of Right Angled Triangle^2)/2
Median on Height of Right Angled Triangle = sqrt(3*Base of Right Angled Triangle^2+Hypotenuse of Right Angled Triangle^2)/2

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