Area of Salinon Calculator

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✖Radius of large semicircle is defined as the distance from the center to the point on the circumference of the semicircle.ⓘ Radius of large semicircle [r_{large_semicircle}]			+10% -10%
✖Radius of small semicircle as the distance from the center to the point on the circumference of the semicircle.ⓘ Radius of small semicircle [r_{small_semicircle}]			+10% -10%

✖The area is the amount of two-dimensional space taken up by an object.ⓘ Area of Salinon [A]

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Credits

Prachi

Kamala Nehru College, University of Delhi (KNC), New Delhi

Prachi has created this Calculator and 100+ more calculators!

Shweta Patil

Walchand College of Engineering (WCE), Sangli

Shweta Patil has verified this Calculator and 1100+ more calculators!

Area of Salinon Solution

STEP 0: Pre-Calculation Summary

Formula Used

area = (1/4)*pi*(Radius of large semicircle+Radius of small semicircle)^2
A = (1/4)*pi*(r_{large_semicircle}+r_{small_semicircle})^2
This formula uses 1 Constants, 2 Variables

Constants Used

pi - Archimedes' constant Value Taken As 3.14159265358979323846264338327950288

Variables Used

Radius of large semicircle - Radius of large semicircle is defined as the distance from the center to the point on the circumference of the semicircle. (Measured in Meter)
Radius of small semicircle - Radius of small semicircle as the distance from the center to the point on the circumference of the semicircle. (Measured in Meter)

STEP 1: Convert Input(s) to Base Unit

Radius of large semicircle: 20 Meter --> 20 Meter No Conversion Required
Radius of small semicircle: 10 Meter --> 10 Meter No Conversion Required

STEP 2: Evaluate Formula

Substituting Input Values in Formula

A = (1/4)*pi*(r_{large_semicircle}+r_{small_semicircle})^2 --> (1/4)*pi*(20+10)^2

Evaluating ... ...

A = 706.858347057703

STEP 3: Convert Result to Output's Unit

706.858347057703 Square Meter --> No Conversion Required

FINAL ANSWER

706.858347057703 Square Meter <-- Area

(Calculation completed in 00.016 seconds)

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< 10+ Salinon Calculators

Area of Salinon

area = (1/4)*pi*(Radius of large semicircle+Radius of small semicircle)^2 Go

Area of Salinon given radius of lateral and small semicircle

area = pi*(Radius of small semicircle+Radius of lateral semicircles)^2 Go

Radius of lateral semicircles of Salinon

radius_lateral_semicircles = (Radius of large semicircle-Radius of small semicircle)/2 Go

Radius of inscribed circle of Salinon

inradius = (Radius of large semicircle+Radius of small semicircle)/2 Go

Radius of inscribed semicircle of Salinon given radius of large and lateral semicircle

inradius = Radius of large semicircle-Radius of lateral semicircles Go

Radius of lateral semicircles of Salinon given radius of large semicircle and inscribed circle

radius_lateral_semicircles = Radius of large semicircle-Inradius Go

Radius of large semicircle of Salinon

radius_large_semicircle = Inradius+Radius of lateral semicircles Go

Radius of small semicircle of Salinon

radius_small_semicircle = Inradius-Radius of lateral semicircles Go

Perimeter of Salinon

perimeter = 2*pi*Radius of large semicircle Go

Area of Salinon given Radius of inscribed circle

area = pi*(Inradius)^2 Go

Area of Salinon Formula

area = (1/4)*pi*(Radius of large semicircle+Radius of small semicircle)^2
A = (1/4)*pi*(r_{large_semicircle}+r_{small_semicircle})^2

What is a Salinon?

Archimedes introduced Salinon, a geometrical figure consisting of four semicircles. The salinon has the same area as the inscribed circle and has the same perimeter as the circle with the radius R.

How to Calculate Area of Salinon?

Area of Salinon calculator uses area = (1/4)*pi*(Radius of large semicircle+Radius of small semicircle)^2 to calculate the Area, The Area of Salinon formula is defined as the total space covered by the Salinon in 2-D space. Area is denoted by A symbol.

How to calculate Area of Salinon using this online calculator? To use this online calculator for Area of Salinon, enter Radius of large semicircle (r_{large_semicircle}) & Radius of small semicircle (r_{small_semicircle}) and hit the calculate button. Here is how the Area of Salinon calculation can be explained with given input values -> 706.8583 = (1/4)*pi*(20+10)^2.

FAQ

What is Area of Salinon?

The Area of Salinon formula is defined as the total space covered by the Salinon in 2-D space and is represented as A = (1/4)*pi*(r_{large_semicircle}+r_{small_semicircle})^2 or area = (1/4)*pi*(Radius of large semicircle+Radius of small semicircle)^2. Radius of large semicircle is defined as the distance from the center to the point on the circumference of the semicircle & Radius of small semicircle as the distance from the center to the point on the circumference of the semicircle.

How to calculate Area of Salinon?

The Area of Salinon formula is defined as the total space covered by the Salinon in 2-D space is calculated using area = (1/4)*pi*(Radius of large semicircle+Radius of small semicircle)^2. To calculate Area of Salinon, you need Radius of large semicircle (r_{large_semicircle}) & Radius of small semicircle (r_{small_semicircle}). With our tool, you need to enter the respective value for Radius of large semicircle & Radius of small semicircle 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 Area?

In this formula, Area uses Radius of large semicircle & Radius of small semicircle. We can use 10 other way(s) to calculate the same, which is/are as follows -

radius_large_semicircle = Inradius+Radius of lateral semicircles
radius_small_semicircle = Inradius-Radius of lateral semicircles
radius_lateral_semicircles = (Radius of large semicircle-Radius of small semicircle)/2
inradius = (Radius of large semicircle+Radius of small semicircle)/2
perimeter = 2*pi*Radius of large semicircle
area = (1/4)*pi*(Radius of large semicircle+Radius of small semicircle)^2
area = pi*(Inradius)^2
inradius = Radius of large semicircle-Radius of lateral semicircles
radius_lateral_semicircles = Radius of large semicircle-Inradius
area = pi*(Radius of small semicircle+Radius of lateral semicircles)^2

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