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Area Projected at solid angle Formula

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Area Projected at Solid Angle is defined as is two-dimensional area measurement of a three-dimensional object by projecting its shape onto an arbitrary plane. Check FAQs

Ω = \frac{Φ m}{I}

Ω - Area Projected at Solid Angle?Φ_m - Magnetic Flux?I - Luminous Intensity?

Area Projected at solid angle Example

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Here is how the Area Projected at solid angle equation looks like with Values.

Here is how the Area Projected at solid angle equation looks like with Units.

Here is how the Area Projected at solid angle equation looks like.

8 = \frac{230}{28.75}

8m² = \frac{230Wb}{28.75cd}

8 = \frac{230}{28.75}

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Area Projected at solid angle Solution

Follow our step by step solution on how to calculate Area Projected at solid angle?

FIRST Step Consider the formula

Ω = \frac{Φ m}{I}

Next Step Substitute values of Variables

∴

Ω = \frac{230Wb}{28.75cd}

Next Step Prepare to Evaluate

∴

Ω = \frac{230}{28.75}

LAST Step Evaluate

∴

Ω = 8m²

Area Projected at solid angle Formula Elements

Variables

Area Projected at Solid Angle

Area Projected at Solid Angle is defined as is two-dimensional area measurement of a three-dimensional object by projecting its shape onto an arbitrary plane.

Symbol: Ω

Measurement: AreaUnit: m²

Note: Value should be greater than 0.

Formulas to find Area Projected at Solid Angle

Magnetic Flux

Magnetic Flux is the number of magnetic field lines passing through a surface.

Symbol: Φ_m

Measurement: Magnetic FluxUnit: Wb

Note: Value should be greater than 0.

Formulas to find Magnetic Flux

Luminous Intensity

Luminous Intensity is a measure of the wavelength-weighted power emitted by a light source in a particular direction per unit solid angle.

Symbol: I

Measurement: Luminous IntensityUnit: cd

Note: Value should be greater than 0.

Formulas to find Luminous Intensity

Other formulas in Light Measurement category

Go Area affected by Light Incident

A = \frac{L p}{H}

Go Intensity on Solid Angle

I = \frac{Φ m}{Ω}

Go Flux at Solid Angle

Φ m = I \cdot Ω

Go Reflected Luminous Flux

Φ r = Φ i \cdot ρ

How to Evaluate Area Projected at solid angle?

Area Projected at solid angle evaluator uses Area Projected at Solid Angle = Magnetic Flux/Luminous Intensity to evaluate the Area Projected at Solid Angle, The Area Projected at solid angle formula is defined as is the two-dimensional area measurement of a three-dimensional object by projecting its shape onto an arbitrary plane. This is often used in mechanical engineering and architectural engineering-related fields, specifically hardness testing, axial stress, wind pressures, and terminal velocity. Area Projected at Solid Angle is denoted by Ω symbol.

How to evaluate Area Projected at solid angle using this online evaluator? To use this online evaluator for Area Projected at solid angle, enter Magnetic Flux (Φ_m) & Luminous Intensity (I) and hit the calculate button.

FAQs on Area Projected at solid angle

What is the formula to find Area Projected at solid angle?

The formula of Area Projected at solid angle is expressed as Area Projected at Solid Angle = Magnetic Flux/Luminous Intensity. Here is an example- 0.04313 = 230/28.75.

How to calculate Area Projected at solid angle?

With Magnetic Flux (Φ_m) & Luminous Intensity (I) we can find Area Projected at solid angle using the formula - Area Projected at Solid Angle = Magnetic Flux/Luminous Intensity.

Can the Area Projected at solid angle be negative?

No, the Area Projected at solid angle, measured in Area cannot be negative.

Which unit is used to measure Area Projected at solid angle?

Area Projected at solid angle 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 Area Projected at solid angle can be measured.

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Area Projected at solid angle Formula

Area Projected at solid angle Example

Area Projected at solid angle Solution

Area Projected at solid angle Formula Elements

Other formulas in Light Measurement category

How to Evaluate Area Projected at solid angle?

FAQs on Area Projected at solid angle

Variable Name