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Refractive Index of Material Given Optical Power Formula

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The Refractive Index of Core is defined as how the light travels through that medium. It defines how much a light ray can bend when it enters from one medium to the other. Check FAQs

η core = n 0 + n 2 \cdot (\frac{P i}{A eff})

η_core - Refractive Index of Core?n₀ - Ordinary Refractive Index?n₂ - Non Linear Index Coefficient?P_i - Incident Optical Power?A_eff - Effective Area?

Refractive Index of Material Given Optical Power Example

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Here is how the Refractive Index of Material Given Optical Power equation looks like with Values.

Here is how the Refractive Index of Material Given Optical Power equation looks like with Units.

Here is how the Refractive Index of Material Given Optical Power equation looks like.

1.335 = 1.203 + 1.1 \cdot (\frac{6}{50})

1.335 = 1.203 + 1.1 \cdot (\frac{6W}{50m²})

1.335 = 1.203 + 1.1 \cdot (\frac{6}{50})

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Refractive Index of Material Given Optical Power Solution

Follow our step by step solution on how to calculate Refractive Index of Material Given Optical Power?

FIRST Step Consider the formula

η core = n 0 + n 2 \cdot (\frac{P i}{A eff})

Next Step Substitute values of Variables

∴

η core = 1.203 + 1.1 \cdot (\frac{6W}{50m²})

Next Step Prepare to Evaluate

∴

η core = 1.203 + 1.1 \cdot (\frac{6}{50})

LAST Step Evaluate

∴

η core = 1.335

Refractive Index of Material Given Optical Power Formula Elements

Variables

Refractive Index of Core

The Refractive Index of Core is defined as how the light travels through that medium. It defines how much a light ray can bend when it enters from one medium to the other.

Symbol: η_core

Measurement: NAUnit: Unitless

Note: Value should be greater than 0.

Formulas to find Refractive Index of Core

Ordinary Refractive Index

Ordinary Refractive Index represents the refractive index of the material under normal conditions, i.e., when there is no (or negligible) optical intensity.

Symbol: n₀

Measurement: NAUnit: Unitless

Note: Value can be positive or negative.

Formulas to find Ordinary Refractive Index

Non Linear Index Coefficient

Non Linear Index Coefficient quantifies the Kerr nonlinearity of a medium.

Symbol: n₂

Measurement: NAUnit: Unitless

Note: Value should be greater than 0.

Formulas to find Non Linear Index Coefficient

Incident Optical Power

Incident Optical Power is a measure of the rate at which light carries energy. It represents the amount of optical energy transmitted per unit of time.

Symbol: P_i

Measurement: PowerUnit: W

Note: Value should be greater than 0.

Formulas to find Incident Optical Power

Effective Area

Effective Area is a measure of the cross-sectional area of an optical fiber through which light effectively propagates.

Symbol: A_eff

Measurement: AreaUnit: m²

Note: Value can be positive or negative.

Formulas to find Effective Area

Other formulas in Fiber Optic Parameters category

Go Carrier to Noise Ratio

CNR = \frac{P car}{P rin + P shot + P the}

Go Fiber Length Given Time Difference

l = \frac{[c] \cdot t dif}{2 \cdot η core}

Go Total Dispersion

t t = \sqrt{{t cd}^{2} + {t pmd}^{2} + {t mod}^{2}}

Go Fourth Intermodulation Product in Four Wave Mixing

v ijk = v i + v j - v k

How to Evaluate Refractive Index of Material Given Optical Power?

Refractive Index of Material Given Optical Power evaluator uses Refractive Index of Core = Ordinary Refractive Index+Non Linear Index Coefficient*(Incident Optical Power/Effective Area) to evaluate the Refractive Index of Core, Refractive Index of Material Given Optical Power is the formula used to calculate the refractive index of material using the optical power and ordinary refractive index. The refractive index is a dimensionless number that describes how light, or any other radiation, propagates through a particular medium. It is defined as the ratio of the speed of light in a vacuum to its speed in a specific medium. The refractive index determines how much the path of light is bent or refracted when entering a material. Refractive Index of Core is denoted by η_core symbol.

How to evaluate Refractive Index of Material Given Optical Power using this online evaluator? To use this online evaluator for Refractive Index of Material Given Optical Power, enter Ordinary Refractive Index (n₀), Non Linear Index Coefficient (n₂), Incident Optical Power (P_i) & Effective Area (A_eff) and hit the calculate button.

FAQs on Refractive Index of Material Given Optical Power

What is the formula to find Refractive Index of Material Given Optical Power?

The formula of Refractive Index of Material Given Optical Power is expressed as Refractive Index of Core = Ordinary Refractive Index+Non Linear Index Coefficient*(Incident Optical Power/Effective Area). Here is an example- 1.335 = 1.203+1.1*(6/50).

How to calculate Refractive Index of Material Given Optical Power?

With Ordinary Refractive Index (n₀), Non Linear Index Coefficient (n₂), Incident Optical Power (P_i) & Effective Area (A_eff) we can find Refractive Index of Material Given Optical Power using the formula - Refractive Index of Core = Ordinary Refractive Index+Non Linear Index Coefficient*(Incident Optical Power/Effective Area).

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Refractive Index of Material Given Optical Power Formula

Refractive Index of Material Given Optical Power Example

Refractive Index of Material Given Optical Power Solution

Refractive Index of Material Given Optical Power Formula Elements

Other formulas in Fiber Optic Parameters category

How to Evaluate Refractive Index of Material Given Optical Power?

FAQs on Refractive Index of Material Given Optical Power

Variable Name