## Area of Triangle using Sides B and C and Cosec of Angle A Solution

STEP 0: Pre-Calculation Summary
Formula Used
Area of Triangle = (Side A of Triangle*Side B of Triangle)/(2*cosec(Angle C of Triangle))
A = (Sa*Sb)/(2*cosec(∠C))
This formula uses 2 Functions, 4 Variables
Functions Used
sec - Secant is a trigonometric function that is defined ratio of the hypotenuse to the shorter side adjacent to an acute angle (in a right-angled triangle); the reciprocal of a cosine., sec(Angle)
cosec - The cosecant function is a trigonometric function that is the reciprocal of the sine function., cosec(Angle)
Variables Used
Area of Triangle - (Measured in Square Meter) - The Area of Triangle is the amount of region or space occupied by the Triangle.
Side A of Triangle - (Measured in Meter) - The Side A of Triangle is the length of the side A, of the three sides of the triangle. In other words, the side A of the Triangle is the side opposite to the angle A.
Side B of Triangle - (Measured in Meter) - The Side B of Triangle is the length of the side B of the three sides. In other words, the side Bof the Triangle is the side opposite to the angle B.
Angle C of Triangle - (Measured in Radian) - Angle C of Triangle is the measure of the wideness of two sides that join to form the corner, opposite to side C of the Triangle.
STEP 1: Convert Input(s) to Base Unit
Side A of Triangle: 10 Meter --> 10 Meter No Conversion Required
Side B of Triangle: 14 Meter --> 14 Meter No Conversion Required
Angle C of Triangle: 110 Degree --> 1.9198621771934 Radian (Check conversion ​here)
STEP 2: Evaluate Formula
Substituting Input Values in Formula
A = (Sa*Sb)/(2*cosec(∠C)) --> (10*14)/(2*cosec(1.9198621771934))
Evaluating ... ...
A = 65.7784834550223
STEP 3: Convert Result to Output's Unit
65.7784834550223 Square Meter --> No Conversion Required
65.7784834550223 65.77848 Square Meter <-- Area of Triangle
(Calculation completed in 00.004 seconds)
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## < 20 Area of Triangle Calculators

Area of Triangle
Area of Triangle = sqrt((Side A of Triangle+Side B of Triangle+Side C of Triangle)*(Side B of Triangle+Side C of Triangle-Side A of Triangle)*(Side A of Triangle-Side B of Triangle+Side C of Triangle)*(Side A of Triangle+Side B of Triangle-Side C of Triangle))/4
Area of Triangle by Heron's Formula
Area of Triangle = sqrt(Semiperimeter of Triangle*(Semiperimeter of Triangle-Side A of Triangle)*(Semiperimeter of Triangle-Side B of Triangle)*(Semiperimeter of Triangle-Side C of Triangle))
Area of Triangle given Two Angles and Third Side
Area of Triangle = (Side A of Triangle^2*sin(Angle B of Triangle)*sin(Angle C of Triangle))/(2*sin(pi-Angle B of Triangle-Angle C of Triangle))
Area of Triangle given Circumradius and Sides
Area of Triangle = (Side A of Triangle*Side B of Triangle*Side C of Triangle)/(4*Circumradius of Triangle)
Area of Triangle using Sides A and B and Cosec of Angle C
Area of Triangle = (Side A of Triangle*Side B of Triangle)/(2*cosec(Angle C of Triangle))
Area of Triangle using Sides B and C and Cosec of Angle A
Area of Triangle = (Side A of Triangle*Side B of Triangle)/(2*cosec(Angle C of Triangle))
Area of Triangle using Sides A and C and Cosec of Angle B
Area of Triangle = (Side A of Triangle*Side C of Triangle)/(2*cosec(Angle B of Triangle))
Area of Triangle given Sides B and C and Sine of Angle A
Area of Triangle = (Side B of Triangle*Side C of Triangle)/2*(sin(Angle A of Triangle))
Area of Triangle given Sides A and C and Sine of Angle B
Area of Triangle = (Side A of Triangle*Side C of Triangle)/2*(sin(Angle B of Triangle))
Area of Triangle given Two Sides and Third Angle
Area of Triangle = Side A of Triangle*Side B of Triangle*sin(Angle C of Triangle)/2
Area of Triangle given Semiperimeter, One Side and its Exradius
Area of Triangle = Exradius Opposite to ∠A of Triangle*(Semiperimeter of Triangle-Side A of Triangle)
Area of Triangle given Side A and Cosec of All Three Angles
Area of Triangle = (Side A of Triangle^2*Cosec A)/(2*Cosec B*Cosec C)
Area of Triangle given Side B and Cosec of All Three Angles
Area of Triangle = (Side B of Triangle^2*Cosec B)/(2*Cosec A*Cosec C)
Area of Triangle given Side C and Cosec of All Three Angles
Area of Triangle = (Side C of Triangle^2*Cosec C)/(2*Cosec A*Cosec B)
Area of Triangle given Side A and Sine of All Three Angles
Area of Triangle = (Side A of Triangle^2*Sin B*Sin C)/(2*Sin A)
Area of Triangle given Side B and Sine of All Three Angles
Area of Triangle = (Side B of Triangle^2*Sin A*Sin C)/(2*Sin B)
Area of Triangle given Side C and Sine of All Three Angles
Area of Triangle = (Side C of Triangle^2*Sin A*Sin B)/(2*Sin C)
Area of Triangle given Base and Height
Area of Triangle = 1/2*Side C of Triangle*Height on Side C of Triangle
Area of Triangle given Inradius and Semiperimeter
Area of Triangle = Inradius of Triangle*Semiperimeter of Triangle

## Area of Triangle using Sides B and C and Cosec of Angle A Formula

Area of Triangle = (Side A of Triangle*Side B of Triangle)/(2*cosec(Angle C of Triangle))
A = (Sa*Sb)/(2*cosec(∠C))

## What is a Triangle ?

A Triangle is a type of polygon, which have three sides and three vertices. This is a two-dimensional figure with three straight sides. A triangle is considered a 3-sided polygon. The sum of all the three angles of a triangle is equal to 180°. The triangle is contained in a single plane. Based on its sides and angle measurement, the triangle has six types.

## How to Calculate Area of Triangle using Sides B and C and Cosec of Angle A?

Area of Triangle using Sides B and C and Cosec of Angle A calculator uses Area of Triangle = (Side A of Triangle*Side B of Triangle)/(2*cosec(Angle C of Triangle)) to calculate the Area of Triangle, The Area of Triangle using Sides B and C and Cosec of Angle A formula is defined as the region occupied inside the triangle, calculated using its two sides A & B and Cosec of Angle B. Area of Triangle is denoted by A symbol.

How to calculate Area of Triangle using Sides B and C and Cosec of Angle A using this online calculator? To use this online calculator for Area of Triangle using Sides B and C and Cosec of Angle A, enter Side A of Triangle (Sa), Side B of Triangle (Sb) & Angle C of Triangle (∠C) and hit the calculate button. Here is how the Area of Triangle using Sides B and C and Cosec of Angle A calculation can be explained with given input values -> 65.77848 = (10*14)/(2*cosec(1.9198621771934)).

### FAQ

What is Area of Triangle using Sides B and C and Cosec of Angle A?
The Area of Triangle using Sides B and C and Cosec of Angle A formula is defined as the region occupied inside the triangle, calculated using its two sides A & B and Cosec of Angle B and is represented as A = (Sa*Sb)/(2*cosec(∠C)) or Area of Triangle = (Side A of Triangle*Side B of Triangle)/(2*cosec(Angle C of Triangle)). The Side A of Triangle is the length of the side A, of the three sides of the triangle. In other words, the side A of the Triangle is the side opposite to the angle A, The Side B of Triangle is the length of the side B of the three sides. In other words, the side Bof the Triangle is the side opposite to the angle B & Angle C of Triangle is the measure of the wideness of two sides that join to form the corner, opposite to side C of the Triangle.
How to calculate Area of Triangle using Sides B and C and Cosec of Angle A?
The Area of Triangle using Sides B and C and Cosec of Angle A formula is defined as the region occupied inside the triangle, calculated using its two sides A & B and Cosec of Angle B is calculated using Area of Triangle = (Side A of Triangle*Side B of Triangle)/(2*cosec(Angle C of Triangle)). To calculate Area of Triangle using Sides B and C and Cosec of Angle A, you need Side A of Triangle (Sa), Side B of Triangle (Sb) & Angle C of Triangle (∠C). With our tool, you need to enter the respective value for Side A of Triangle, Side B of Triangle & Angle C of 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 Area of Triangle?
In this formula, Area of Triangle uses Side A of Triangle, Side B of Triangle & Angle C of Triangle. We can use 19 other way(s) to calculate the same, which is/are as follows -
• Area of Triangle = sqrt(Semiperimeter of Triangle*(Semiperimeter of Triangle-Side A of Triangle)*(Semiperimeter of Triangle-Side B of Triangle)*(Semiperimeter of Triangle-Side C of Triangle))
• Area of Triangle = 1/2*Side C of Triangle*Height on Side C of Triangle
• Area of Triangle = sqrt((Side A of Triangle+Side B of Triangle+Side C of Triangle)*(Side B of Triangle+Side C of Triangle-Side A of Triangle)*(Side A of Triangle-Side B of Triangle+Side C of Triangle)*(Side A of Triangle+Side B of Triangle-Side C of Triangle))/4
• Area of Triangle = (Side A of Triangle^2*sin(Angle B of Triangle)*sin(Angle C of Triangle))/(2*sin(pi-Angle B of Triangle-Angle C of Triangle))
• Area of Triangle = Side A of Triangle*Side B of Triangle*sin(Angle C of Triangle)/2
• Area of Triangle = (Side A of Triangle*Side B of Triangle*Side C of Triangle)/(4*Circumradius of Triangle)
• Area of Triangle = Inradius of Triangle*Semiperimeter of Triangle
• Area of Triangle = sqrt(Exradius Opposite to ∠A of Triangle*Exradius Opposite to ∠B of Triangle*Exradius Opposite to ∠C of Triangle*Inradius of Triangle)
• Area of Triangle = Exradius Opposite to ∠A of Triangle*(Semiperimeter of Triangle-Side A of Triangle)
• Area of Triangle = (Side B of Triangle*Side C of Triangle)/2*(sin(Angle A of Triangle))
• Area of Triangle = (Side A of Triangle*Side C of Triangle)/2*(sin(Angle B of Triangle))
• Area of Triangle = (Side A of Triangle*Side B of Triangle)/(2*cosec(Angle C of Triangle))
• Area of Triangle = (Side A of Triangle*Side C of Triangle)/(2*cosec(Angle B of Triangle))
• Area of Triangle = (Side A of Triangle^2*Sin B*Sin C)/(2*Sin A)
• Area of Triangle = (Side B of Triangle^2*Sin A*Sin C)/(2*Sin B)
• Area of Triangle = (Side C of Triangle^2*Sin A*Sin B)/(2*Sin C)
• Area of Triangle = (Side A of Triangle^2*Cosec A)/(2*Cosec B*Cosec C)
• Area of Triangle = (Side B of Triangle^2*Cosec B)/(2*Cosec A*Cosec C)
• Area of Triangle = (Side C of Triangle^2*Cosec C)/(2*Cosec A*Cosec B)
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