Height on Medium Side of Scalene Triangle given Longer Side and Smaller Angle Solution

STEP 0: Pre-Calculation Summary
Formula Used
Height on Medium Side of Scalene Triangle = Longer Side of Scalene Triangle*sin(Smaller Angle of Scalene Triangle)
hMedium = SLonger*sin(Smaller)
This formula uses 1 Functions, 3 Variables
Functions Used
sin - Sine is a trigonometric function that describes the ratio of the length of the opposite side of a right triangle to the length of the hypotenuse., sin(Angle)
Variables Used
Height on Medium Side of Scalene Triangle - (Measured in Meter) - The height on medium side of Scalene Triangle is the length of the perpendicular from medium side of the triangle to the opposite vertex.
Longer Side of Scalene Triangle - (Measured in Meter) - The Longer Side of Scalene Triangle is the length of the longer side out of the three sides. In other words, the longer side of the Scalene Triangle is the side opposite to the larger angle.
Smaller Angle of Scalene Triangle - (Measured in Radian) - The Smaller Angle of Scalene Triangle is the measure of the wideness of sides that join to form the corner opposite the shorter side of the Scalene Triangle.
STEP 1: Convert Input(s) to Base Unit
Longer Side of Scalene Triangle: 20 Meter --> 20 Meter No Conversion Required
Smaller Angle of Scalene Triangle: 30 Degree --> 0.5235987755982 Radian (Check conversion ​here)
STEP 2: Evaluate Formula
Substituting Input Values in Formula
hMedium = SLonger*sin(∠Smaller) --> 20*sin(0.5235987755982)
Evaluating ... ...
hMedium = 10
STEP 3: Convert Result to Output's Unit
10 Meter --> No Conversion Required
FINAL ANSWER
10 Meter <-- Height on Medium Side of Scalene Triangle
(Calculation completed in 00.021 seconds)

Credits

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Created by Jaseem K
IIT Madras (IIT Madras), Chennai
Jaseem K has created this Calculator and 100+ more calculators!
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Verified by Shweta Patil
Walchand College of Engineering (WCE), Sangli
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Heights of Scalene Triangle Calculators

Height on Longer Side of Scalene Triangle given Medium Side and Smaller Angle
​ LaTeX ​ Go Height on Longer Side of Scalene Triangle = Medium Side of Scalene Triangle*sin(Smaller Angle of Scalene Triangle)
Height on Longer Side of Scalene Triangle given Shorter Side and Medium Angle
​ LaTeX ​ Go Height on Longer Side of Scalene Triangle = Shorter Side of Scalene Triangle*sin(Medium Angle of Scalene Triangle)
Height on Medium Side of Scalene Triangle given Longer Side and Smaller Angle
​ LaTeX ​ Go Height on Medium Side of Scalene Triangle = Longer Side of Scalene Triangle*sin(Smaller Angle of Scalene Triangle)
Height on Medium Side of Scalene Triangle given Shorter Side and Larger Angle
​ LaTeX ​ Go Height on Medium Side of Scalene Triangle = Shorter Side of Scalene Triangle*sin(Larger Angle of Scalene Triangle)

Height on Medium Side of Scalene Triangle given Longer Side and Smaller Angle Formula

​LaTeX ​Go
Height on Medium Side of Scalene Triangle = Longer Side of Scalene Triangle*sin(Smaller Angle of Scalene Triangle)
hMedium = SLonger*sin(Smaller)

Height of a Scalene Triangle and it's importance

The perpendicular distance between a particular side (or the line containing that side) of the Scalene Triangle, and the corner of the triangle just opposite to that side is called the height of the Scalene Triangle from that side. If we take a particular side and know the height from that side, then the area of the Scalene Triangle is half of their product.

What is a Scalene Triangle?

A triangle with all sides are distinct in length is called a Scalene Triangle. Mainly triangles are classified into three on the basis of side lengths. If all sides are equal in length then it is called Equilateral Triangle. If only two sides are equal in length then it is called Isosceles Triangle. If no sides are equal, or all sides are distinct in length then it is called Scalene Triangle. Cases are similar in terms of angles also. That is, Equilateral Triangles have all three angles equal. Isosceles Triangles have atleast two angles are equal. And then, Scalene Triangles have all three angles are distinct.

How to Calculate Height on Medium Side of Scalene Triangle given Longer Side and Smaller Angle?

Height on Medium Side of Scalene Triangle given Longer Side and Smaller Angle calculator uses Height on Medium Side of Scalene Triangle = Longer Side of Scalene Triangle*sin(Smaller Angle of Scalene Triangle) to calculate the Height on Medium Side of Scalene Triangle, Height on Medium Side of Scalene Triangle given Longer Side and Smaller Angle formula is defined as the perpendicular distance from the medium angle corner to the medium side of the Scalene Triangle, calculated using its longer side and smaller angle. Height on Medium Side of Scalene Triangle is denoted by hMedium symbol.

How to calculate Height on Medium Side of Scalene Triangle given Longer Side and Smaller Angle using this online calculator? To use this online calculator for Height on Medium Side of Scalene Triangle given Longer Side and Smaller Angle, enter Longer Side of Scalene Triangle (SLonger) & Smaller Angle of Scalene Triangle (∠Smaller) and hit the calculate button. Here is how the Height on Medium Side of Scalene Triangle given Longer Side and Smaller Angle calculation can be explained with given input values -> 10 = 20*sin(0.5235987755982).

FAQ

What is Height on Medium Side of Scalene Triangle given Longer Side and Smaller Angle?
Height on Medium Side of Scalene Triangle given Longer Side and Smaller Angle formula is defined as the perpendicular distance from the medium angle corner to the medium side of the Scalene Triangle, calculated using its longer side and smaller angle and is represented as hMedium = SLonger*sin(∠Smaller) or Height on Medium Side of Scalene Triangle = Longer Side of Scalene Triangle*sin(Smaller Angle of Scalene Triangle). The Longer Side of Scalene Triangle is the length of the longer side out of the three sides. In other words, the longer side of the Scalene Triangle is the side opposite to the larger angle & The Smaller Angle of Scalene Triangle is the measure of the wideness of sides that join to form the corner opposite the shorter side of the Scalene Triangle.
How to calculate Height on Medium Side of Scalene Triangle given Longer Side and Smaller Angle?
Height on Medium Side of Scalene Triangle given Longer Side and Smaller Angle formula is defined as the perpendicular distance from the medium angle corner to the medium side of the Scalene Triangle, calculated using its longer side and smaller angle is calculated using Height on Medium Side of Scalene Triangle = Longer Side of Scalene Triangle*sin(Smaller Angle of Scalene Triangle). To calculate Height on Medium Side of Scalene Triangle given Longer Side and Smaller Angle, you need Longer Side of Scalene Triangle (SLonger) & Smaller Angle of Scalene Triangle (∠Smaller). With our tool, you need to enter the respective value for Longer Side of Scalene Triangle & Smaller Angle of Scalene 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 Height on Medium Side of Scalene Triangle?
In this formula, Height on Medium Side of Scalene Triangle uses Longer Side of Scalene Triangle & Smaller Angle of Scalene Triangle. We can use 1 other way(s) to calculate the same, which is/are as follows -
  • Height on Medium Side of Scalene Triangle = Shorter Side of Scalene Triangle*sin(Larger Angle of Scalene Triangle)
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