The formula to calculate the Energy Band Gap (Eg) is:
\[ E_g = E_{G0} - (T \cdot \beta_k) \]
Energy Band Gap describes the influence of photons on band-gap energy. Energy Band Gap at 0K describes the influence of photons on band-gap energy at 0K temperature. Temperature is the degree or intensity of heat present in a substance or object. Material Specific Constant is defined as the constant which is determined experimentally and differs from material to material.
Let's assume the following values:
Using the formula:
\[ E_g = 1.39389427710001E-19 - (290 \cdot 5.7678E-23) \approx 1.22662807710001E-19 \]
The Energy Band Gap is approximately 1.22662807710001E-19 J.
| Energy Band Gap at 0K (J) | Temperature (K) | Material Specific Constant (J/K) | Energy Band Gap (J) |
|---|---|---|---|
| 1.3938942771E-19 | 280 | 5.7678E-23 | 0.00000000000000 |
| 1.3938942771E-19 | 282 | 5.7678E-23 | 0.00000000000000 |
| 1.3938942771E-19 | 284 | 5.7678E-23 | 0.00000000000000 |
| 1.3938942771E-19 | 286 | 5.7678E-23 | 0.00000000000000 |
| 1.3938942771E-19 | 288 | 5.7678E-23 | 0.00000000000000 |
| 1.3938942771E-19 | 290 | 5.7678E-23 | 0.00000000000000 |
| 1.3938942771E-19 | 292 | 5.7678E-23 | 0.00000000000000 |
| 1.3938942771E-19 | 294 | 5.7678E-23 | 0.00000000000000 |
| 1.3938942771E-19 | 296 | 5.7678E-23 | 0.00000000000000 |
| 1.3938942771E-19 | 298 | 5.7678E-23 | 0.00000000000000 |
| 1.3938942771E-19 | 300 | 5.7678E-23 | 0.00000000000000 |