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Total Surface Area of Parallelepiped given Volume, Side B and Side C Formula

GoTotal Surface Area of Parallelepiped Formula

GoTotal Surface Area of Parallelepiped given Lateral Surface Area Formula

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Total Surface Area of Parallelepiped is the total quantity of plane enclosed by the entire surface of the Parallelepiped. Check FAQs

TSA = 2 \cdot (\frac{V \cdot \sin (∠γ)}{S c \cdot \sqrt{1 + (2 \cdot \cos (∠α) \cdot \cos (∠β) \cdot \cos (∠γ)) - ({\cos (∠α)}^{2} + {\cos (∠β)}^{2} + {\cos (∠γ)}^{2})}} + \frac{V \cdot \sin (∠β)}{S b \cdot \sqrt{1 + (2 \cdot \cos (∠α) \cdot \cos (∠β) \cdot \cos (∠γ)) - ({\cos (∠α)}^{2} + {\cos (∠β)}^{2} + {\cos (∠γ)}^{2})}} + (S b \cdot S c \cdot \sin (∠α)))

TSA - Total Surface Area of Parallelepiped?V - Volume of Parallelepiped?∠γ - Angle Gamma of Parallelepiped?S_c - Side C of Parallelepiped?∠α - Angle Alpha of Parallelepiped?∠β - Angle Beta of Parallelepiped?S_b - Side B of Parallelepiped?

Total Surface Area of Parallelepiped given Volume, Side B and Side C Example

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Here is how the Total Surface Area of Parallelepiped given Volume, Side B and Side C equation looks like with Values.

Here is how the Total Surface Area of Parallelepiped given Volume, Side B and Side C equation looks like with Units.

Here is how the Total Surface Area of Parallelepiped given Volume, Side B and Side C equation looks like.

1961.568 = 2 \cdot (\frac{3630 \cdot \sin (75)}{10 \cdot \sqrt{1 + (2 \cdot \cos (45) \cdot \cos (60) \cdot \cos (75)) - ({\cos (45)}^{2} + {\cos (60)}^{2} + {\cos (75)}^{2})}} + \frac{3630 \cdot \sin (60)}{20 \cdot \sqrt{1 + (2 \cdot \cos (45) \cdot \cos (60) \cdot \cos (75)) - ({\cos (45)}^{2} + {\cos (60)}^{2} + {\cos (75)}^{2})}} + (20 \cdot 10 \cdot \sin (45)))

1961.568m² = 2 \cdot (\frac{3630m³ \cdot \sin (75°)}{10m \cdot \sqrt{1 + (2 \cdot \cos (45°) \cdot \cos (60°) \cdot \cos (75°)) - ({\cos (45°)}^{2} + {\cos (60°)}^{2} + {\cos (75°)}^{2})}} + \frac{3630m³ \cdot \sin (60°)}{20m \cdot \sqrt{1 + (2 \cdot \cos (45°) \cdot \cos (60°) \cdot \cos (75°)) - ({\cos (45°)}^{2} + {\cos (60°)}^{2} + {\cos (75°)}^{2})}} + (20m \cdot 10m \cdot \sin (45°)))

1961.568 = 2 \cdot (\frac{3630 \cdot \sin (75)}{10 \cdot \sqrt{1 + (2 \cdot \cos (45) \cdot \cos (60) \cdot \cos (75)) - ({\cos (45)}^{2} + {\cos (60)}^{2} + {\cos (75)}^{2})}} + \frac{3630 \cdot \sin (60)}{20 \cdot \sqrt{1 + (2 \cdot \cos (45) \cdot \cos (60) \cdot \cos (75)) - ({\cos (45)}^{2} + {\cos (60)}^{2} + {\cos (75)}^{2})}} + (20 \cdot 10 \cdot \sin (45)))

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Total Surface Area of Parallelepiped given Volume, Side B and Side C Solution

Follow our step by step solution on how to calculate Total Surface Area of Parallelepiped given Volume, Side B and Side C?

FIRST Step Consider the formula

TSA = 2 \cdot (\frac{V \cdot \sin (∠γ)}{S c \cdot \sqrt{1 + (2 \cdot \cos (∠α) \cdot \cos (∠β) \cdot \cos (∠γ)) - ({\cos (∠α)}^{2} + {\cos (∠β)}^{2} + {\cos (∠γ)}^{2})}} + \frac{V \cdot \sin (∠β)}{S b \cdot \sqrt{1 + (2 \cdot \cos (∠α) \cdot \cos (∠β) \cdot \cos (∠γ)) - ({\cos (∠α)}^{2} + {\cos (∠β)}^{2} + {\cos (∠γ)}^{2})}} + (S b \cdot S c \cdot \sin (∠α)))

Next Step Substitute values of Variables

∴

TSA = 2 \cdot (\frac{3630m³ \cdot \sin (75°)}{10m \cdot \sqrt{1 + (2 \cdot \cos (45°) \cdot \cos (60°) \cdot \cos (75°)) - ({\cos (45°)}^{2} + {\cos (60°)}^{2} + {\cos (75°)}^{2})}} + \frac{3630m³ \cdot \sin (60°)}{20m \cdot \sqrt{1 + (2 \cdot \cos (45°) \cdot \cos (60°) \cdot \cos (75°)) - ({\cos (45°)}^{2} + {\cos (60°)}^{2} + {\cos (75°)}^{2})}} + (20m \cdot 10m \cdot \sin (45°)))

Next Step Convert Units

∴

TSA = 2 \cdot (\frac{3630m³ \cdot \sin (1.309rad)}{10m \cdot \sqrt{1 + (2 \cdot \cos (0.7854rad) \cdot \cos (1.0472rad) \cdot \cos (1.309rad)) - ({\cos (0.7854rad)}^{2} + {\cos (1.0472rad)}^{2} + {\cos (1.309rad)}^{2})}} + \frac{3630m³ \cdot \sin (1.0472rad)}{20m \cdot \sqrt{1 + (2 \cdot \cos (0.7854rad) \cdot \cos (1.0472rad) \cdot \cos (1.309rad)) - ({\cos (0.7854rad)}^{2} + {\cos (1.0472rad)}^{2} + {\cos (1.309rad)}^{2})}} + (20m \cdot 10m \cdot \sin (0.7854rad)))

Next Step Prepare to Evaluate

∴

TSA = 2 \cdot (\frac{3630 \cdot \sin (1.309)}{10 \cdot \sqrt{1 + (2 \cdot \cos (0.7854) \cdot \cos (1.0472) \cdot \cos (1.309)) - ({\cos (0.7854)}^{2} + {\cos (1.0472)}^{2} + {\cos (1.309)}^{2})}} + \frac{3630 \cdot \sin (1.0472)}{20 \cdot \sqrt{1 + (2 \cdot \cos (0.7854) \cdot \cos (1.0472) \cdot \cos (1.309)) - ({\cos (0.7854)}^{2} + {\cos (1.0472)}^{2} + {\cos (1.309)}^{2})}} + (20 \cdot 10 \cdot \sin (0.7854)))

Next Step Evaluate

∴

TSA = 1961.56802034067m²

LAST Step Rounding Answer

∴

TSA = 1961.568m²

Total Surface Area of Parallelepiped given Volume, Side B and Side C Formula Elements

Variables

Functions

Total Surface Area of Parallelepiped

Total Surface Area of Parallelepiped is the total quantity of plane enclosed by the entire surface of the Parallelepiped.

Symbol: TSA

Measurement: AreaUnit: m²

Note: Value should be greater than 0.

Formulas to find Total Surface Area of Parallelepiped

Volume of Parallelepiped

Volume of Parallelepiped is the total quantity of three-dimensional space enclosed by the surface of the Parallelepiped.

Symbol: V

Measurement: VolumeUnit: m³

Note: Value should be greater than 0.

Formulas to find Volume of Parallelepiped

Angle Gamma of Parallelepiped

Angle Gamma of Parallelepiped is the angle formed by side A and side B at any of the two sharp tips of the Parallelepiped.

Symbol: ∠γ

Measurement: AngleUnit: °

Note: Value should be between 0 to 180.

Formulas to find Angle Gamma of Parallelepiped

Side C of Parallelepiped

Side C of Parallelepiped is the length of any one out of the three sides from any fixed vertex of the Parallelepiped.

Symbol: S_c

Measurement: LengthUnit: m

Note: Value should be greater than 0.

Formulas to find Side C of Parallelepiped

Angle Alpha of Parallelepiped

Angle Alpha of Parallelepiped is the angle formed by side B and side C at any of the two sharp tips of the Parallelepiped.

Symbol: ∠α

Measurement: AngleUnit: °

Note: Value should be between 0 to 180.

Formulas to find Angle Alpha of Parallelepiped

Angle Beta of Parallelepiped

Angle Beta of Parallelepiped is the angle formed by side A and side C at any of the two sharp tips of the Parallelepiped.

Symbol: ∠β

Measurement: AngleUnit: °

Note: Value should be between 0 to 180.

Formulas to find Angle Beta of Parallelepiped

Side B of Parallelepiped

Side B of Parallelepiped is the length of any one out of the three sides from any fixed vertex of the Parallelepiped.

Symbol: S_b

Measurement: LengthUnit: m

Note: Value should be greater than 0.

Formulas to find Side B of Parallelepiped

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.

Syntax: sin(Angle)

cos

Cosine of an angle is the ratio of the side adjacent to the angle to the hypotenuse of the triangle.

Syntax: cos(Angle)

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.

Syntax: sqrt(Number)

Other Formulas to find Total Surface Area of Parallelepiped

Go Total Surface Area of Parallelepiped

TSA = 2 \cdot ((S a \cdot S b \cdot \sin (∠γ)) + (S a \cdot S c \cdot \sin (∠β)) + (S b \cdot S c \cdot \sin (∠α)))

Go Total Surface Area of Parallelepiped given Lateral Surface Area

TSA = LSA + 2 \cdot S a \cdot S c \cdot \sin (∠β)

How to Evaluate Total Surface Area of Parallelepiped given Volume, Side B and Side C?

Total Surface Area of Parallelepiped given Volume, Side B and Side C evaluator uses Total Surface Area of Parallelepiped = 2*((Volume of Parallelepiped*sin(Angle Gamma of Parallelepiped))/(Side C of Parallelepiped*sqrt(1+(2*cos(Angle Alpha of Parallelepiped)*cos(Angle Beta of Parallelepiped)*cos(Angle Gamma of Parallelepiped))-(cos(Angle Alpha of Parallelepiped)^2+cos(Angle Beta of Parallelepiped)^2+cos(Angle Gamma of Parallelepiped)^2)))+(Volume of Parallelepiped*sin(Angle Beta of Parallelepiped))/(Side B of Parallelepiped*sqrt(1+(2*cos(Angle Alpha of Parallelepiped)*cos(Angle Beta of Parallelepiped)*cos(Angle Gamma of Parallelepiped))-(cos(Angle Alpha of Parallelepiped)^2+cos(Angle Beta of Parallelepiped)^2+cos(Angle Gamma of Parallelepiped)^2)))+(Side B of Parallelepiped*Side C of Parallelepiped*sin(Angle Alpha of Parallelepiped))) to evaluate the Total Surface Area of Parallelepiped, The Total Surface Area of Parallelepiped given Volume, Side B and Side C formula is defined as measure of the total quantity of plane enclosed by the entire surface of the Parallelepiped, calculated using volume, side B and side C of Parallelepiped. Total Surface Area of Parallelepiped is denoted by TSA symbol.

How to evaluate Total Surface Area of Parallelepiped given Volume, Side B and Side C using this online evaluator? To use this online evaluator for Total Surface Area of Parallelepiped given Volume, Side B and Side C, enter Volume of Parallelepiped (V), Angle Gamma of Parallelepiped (∠γ), Side C of Parallelepiped (S_c), Angle Alpha of Parallelepiped (∠α), Angle Beta of Parallelepiped (∠β) & Side B of Parallelepiped (S_b) and hit the calculate button.

FAQs on Total Surface Area of Parallelepiped given Volume, Side B and Side C

What is the formula to find Total Surface Area of Parallelepiped given Volume, Side B and Side C?

The formula of Total Surface Area of Parallelepiped given Volume, Side B and Side C is expressed as Total Surface Area of Parallelepiped = 2*((Volume of Parallelepiped*sin(Angle Gamma of Parallelepiped))/(Side C of Parallelepiped*sqrt(1+(2*cos(Angle Alpha of Parallelepiped)*cos(Angle Beta of Parallelepiped)*cos(Angle Gamma of Parallelepiped))-(cos(Angle Alpha of Parallelepiped)^2+cos(Angle Beta of Parallelepiped)^2+cos(Angle Gamma of Parallelepiped)^2)))+(Volume of Parallelepiped*sin(Angle Beta of Parallelepiped))/(Side B of Parallelepiped*sqrt(1+(2*cos(Angle Alpha of Parallelepiped)*cos(Angle Beta of Parallelepiped)*cos(Angle Gamma of Parallelepiped))-(cos(Angle Alpha of Parallelepiped)^2+cos(Angle Beta of Parallelepiped)^2+cos(Angle Gamma of Parallelepiped)^2)))+(Side B of Parallelepiped*Side C of Parallelepiped*sin(Angle Alpha of Parallelepiped))). Here is an example- 1961.568 = 2*((3630*sin(1.3089969389955))/(10*sqrt(1+(2*cos(0.785398163397301)*cos(1.0471975511964)*cos(1.3089969389955))-(cos(0.785398163397301)^2+cos(1.0471975511964)^2+cos(1.3089969389955)^2)))+(3630*sin(1.0471975511964))/(20*sqrt(1+(2*cos(0.785398163397301)*cos(1.0471975511964)*cos(1.3089969389955))-(cos(0.785398163397301)^2+cos(1.0471975511964)^2+cos(1.3089969389955)^2)))+(20*10*sin(0.785398163397301))).

How to calculate Total Surface Area of Parallelepiped given Volume, Side B and Side C?

With Volume of Parallelepiped (V), Angle Gamma of Parallelepiped (∠γ), Side C of Parallelepiped (S_c), Angle Alpha of Parallelepiped (∠α), Angle Beta of Parallelepiped (∠β) & Side B of Parallelepiped (S_b) we can find Total Surface Area of Parallelepiped given Volume, Side B and Side C using the formula - Total Surface Area of Parallelepiped = 2*((Volume of Parallelepiped*sin(Angle Gamma of Parallelepiped))/(Side C of Parallelepiped*sqrt(1+(2*cos(Angle Alpha of Parallelepiped)*cos(Angle Beta of Parallelepiped)*cos(Angle Gamma of Parallelepiped))-(cos(Angle Alpha of Parallelepiped)^2+cos(Angle Beta of Parallelepiped)^2+cos(Angle Gamma of Parallelepiped)^2)))+(Volume of Parallelepiped*sin(Angle Beta of Parallelepiped))/(Side B of Parallelepiped*sqrt(1+(2*cos(Angle Alpha of Parallelepiped)*cos(Angle Beta of Parallelepiped)*cos(Angle Gamma of Parallelepiped))-(cos(Angle Alpha of Parallelepiped)^2+cos(Angle Beta of Parallelepiped)^2+cos(Angle Gamma of Parallelepiped)^2)))+(Side B of Parallelepiped*Side C of Parallelepiped*sin(Angle Alpha of Parallelepiped))). This formula also uses Sine (sin)Cosine (cos), Square Root (sqrt) function(s).

What are the other ways to Calculate Total Surface Area of Parallelepiped?

Here are the different ways to Calculate Total Surface Area of Parallelepiped-

Total Surface Area of Parallelepiped=2*((Side A of Parallelepiped*Side B of Parallelepiped*sin(Angle Gamma of Parallelepiped))+(Side A of Parallelepiped*Side C of Parallelepiped*sin(Angle Beta of Parallelepiped))+(Side B of Parallelepiped*Side C of Parallelepiped*sin(Angle Alpha of Parallelepiped)))
Total Surface Area of Parallelepiped=Lateral Surface Area of Parallelepiped+2*Side A of Parallelepiped*Side C of Parallelepiped*sin(Angle Beta of Parallelepiped)
Total Surface Area of Parallelepiped=2*((Side A of Parallelepiped*Side B of Parallelepiped*sin(Angle Gamma of Parallelepiped))+(Volume of Parallelepiped*sin(Angle Beta of Parallelepiped))/(Side B of Parallelepiped*sqrt(1+(2*cos(Angle Alpha of Parallelepiped)*cos(Angle Beta of Parallelepiped)*cos(Angle Gamma of Parallelepiped))-(cos(Angle Alpha of Parallelepiped)^2+cos(Angle Beta of Parallelepiped)^2+cos(Angle Gamma of Parallelepiped)^2)))+(Volume of Parallelepiped*sin(Angle Alpha of Parallelepiped))/(Side A of Parallelepiped*sqrt(1+(2*cos(Angle Alpha of Parallelepiped)*cos(Angle Beta of Parallelepiped)*cos(Angle Gamma of Parallelepiped))-(cos(Angle Alpha of Parallelepiped)^2+cos(Angle Beta of Parallelepiped)^2+cos(Angle Gamma of Parallelepiped)^2))))

Can the Total Surface Area of Parallelepiped given Volume, Side B and Side C be negative?

No, the Total Surface Area of Parallelepiped given Volume, Side B and Side C, measured in Area cannot be negative.

Which unit is used to measure Total Surface Area of Parallelepiped given Volume, Side B and Side C?

Total Surface Area of Parallelepiped given Volume, Side B and Side C is usually measured using the Square Meter[m²] for Area. Square Kilometer[m²], Square Centimeter[m²], Square Millimeter[m²] are the few other units in which Total Surface Area of Parallelepiped given Volume, Side B and Side C can be measured.

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Total Surface Area of Parallelepiped given Volume, Side B and Side C Formula

​GoTotal Surface Area of Parallelepiped Formula

​GoTotal Surface Area of Parallelepiped given Lateral Surface Area Formula

Total Surface Area of Parallelepiped given Volume, Side B and Side C Example

Total Surface Area of Parallelepiped given Volume, Side B and Side C Solution

Total Surface Area of Parallelepiped given Volume, Side B and Side C Formula Elements

Other Formulas to find Total Surface Area of Parallelepiped

How to Evaluate Total Surface Area of Parallelepiped given Volume, Side B and Side C?

FAQs on Total Surface Area of Parallelepiped given Volume, Side B and Side C

Variable Name

GoTotal Surface Area of Parallelepiped Formula

GoTotal Surface Area of Parallelepiped given Lateral Surface Area Formula