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The **Bavarian Formula Calculator** helps international students convert their CGPA or GPA into the German grading system, which is vital for admissions. German universities use this system to assess applicants’ academic qualifications. A **2.7 GPA** is considered average, while a **1.5 GPA** is excellent.

**Formula**:

Contents

The formula is:

$\text{BG} = \frac{3 \times (\text{MG} - \text{OG})}{(\text{MG} - \text{MPG})} + 1$

Variable |
Meaning |
---|---|

BG | Bavarian Gravity (a measure used in brewing, usually in degrees Plato) |

MG | Measured Gravity (the actual gravity of the beer after fermentation) |

OG | Original Gravity (the gravity of the wort before fermentation) |

MPG | Maximum Possible Gravity (the highest potential gravity during fermentation) |

**How to Calculate ?**

To calculate the **Bavarian Gravity (BG)**:

- Subtract the original gravity (OG) from the measured gravity (MG).
- Multiply the result by 3.
- Divide by the difference between the measured gravity (MG) and the maximum possible gravity (MPG).
- Add 1 to the final result.

**Solved Calculations :**

**Example 1:**

**Given**:

- Measured Gravity (MG) = 1.050
- Original Gravity (OG) = 1.040
- Maximum Possible Gravity (MPG) = 1.100

Calculation |
Instructions |
---|---|

Step 1: BG = $\frac{3 \times (\text{MG} - \text{OG})}{(\text{MG} - \text{MPG})} + 1$ |
Start with the formula. |

Step 2: BG = $\frac{3 \times (1.050 - 1.040)}{(1.050 - 1.100)} + 1$ |
Replace MG with 1.050, OG with 1.040, and MPG with 1.100. |

Step 3: BG = $\frac{3 \times 0.010}{-0.050} + 1$ |
Subtract OG from MG and MPG from MG. |

Step 4: BG = $\frac{0.030}{-0.050} + 1$ |
Multiply by 3. |

Step 5: BG = -0.6 + 1 |
Divide 0.030 by -0.050. |

Step 6: BG = 0.4 |
Add 1 to the result. |

**Answer**:

The Bavarian Gravity is **0.4**.

**Example 2:**

**Given**:

- Measured Gravity (MG) = 1.080
- Original Gravity (OG) = 1.060
- Maximum Possible Gravity (MPG) = 1.120

Calculation |
Instructions |
---|---|

Step 1: BG = $\frac{3 \times (\text{MG} - \text{OG})}{(\text{MG} - \text{MPG})} + 1$ |
Start with the formula. |

Step 2: BG = $\frac{3 \times (1.080 - 1.060)}{(1.080 - 1.120)} + 1$ |
Replace MG with 1.080, OG with 1.060, and MPG with 1.120. |

Step 3: BG = $\frac{3 \times 0.020}{-0.040} + 1$ |
Subtract OG from MG and MPG from MG. |

Step 4: BG = $\frac{0.060}{-0.040} + 1$ |
Multiply by 3. |

Step 5: BG = -1.5 + 1 |
Divide 0.060 by -0.040. |

Step 6: BG = -0.5 |
Add 1 to the result. |

**Answer**:

The Bavarian Gravity is **-0.5**.

**What is Bavarian Formula Calculator ?**

The **Bavarian Formula Calculator** is used to convert international grades, such as CGPA or GPA, into the German grading system, which ranges from 1.0 (very good) to 5.0 (fail). This formula helps international students understand how their grades compare when applying to German universities.

For instance, a **2.7 GPA** in Germany is considered average, while a **1.5 GPA** is excellent. Converting grades using the **Bavarian Formula** allows universities to evaluate whether your academic background aligns with their requirements for admissions, especially for programs like MS in Germany.

In Germany, grades are calculated on a percentage-based system, and a **70%** translates to approximately **2.3** in the German grading scale. For students with a **low CGPA** considering higher education in Germany, the **minimum GPA** requirement can vary, but most universities look for a CGPA above **2.5**.

A **3.0 GPA** is considered a solid grade for master's programs in Germany. However, some universities may still accept students with lower GPAs depending on the program. Additionally, if you're looking at pursuing a master's in Germany, a **6.5 CGPA** might suffice for some courses, but for highly competitive programs, a higher GPA could be necessary.

### Final Words:

The Bavarian Formula Calculator offers a straightforward approach to determining the Bavarian Grade, facilitating grade conversion and comparative analysis across different grading systems. By providing a standardized method for calculating grades, it promotes fairness and consistency in academic evaluation.