This repo contains LoRA adapter weights.
Model Description
- Project GitHub Page: https://github.com/adityasihag1996/math_QA.git
- Developed by: Aditya Sihag
- Model type: fine-tuned using QLoRA on 1x RTX 4090
- Finetuned from model: mistralai/Mistral-7B-v0.1
Results
| Prompt Approach | GSM8k | MATH |
|---|---|---|
| Zero-Shot CoT | 75.81 | - |
Training procedure
The following bitsandbytes quantization config was used during training:
- quant_method: bitsandbytes
- load_in_8bit: False
- load_in_4bit: True
- bnb_4bit_quant_type: nf4
- bnb_4bit_use_double_quant: True
- bnb_4bit_compute_dtype: float16
LoraConfig params:
- r: 128
- lora_alpha: lora_r * 2
- lora_dropout: 0.05
- bias: "none"
- task_type: "CAUSAL_LM"
- target_modules: ["q_proj", "k_proj", "v_proj", "o_proj", "gate_proj", "up_proj", "down_proj"]
The hyperparameters for the LoRA fine-tuning are listed below:
- epochs: 3
- learning_rate: 5e-5
- batch_size: 256
- max_grad_norm: 1.0
- weight_decay: 0.001
- lr_scheduler_type: "cosine"
- warmup_ratio: 0.03
Dataset
math_QA dataset is prepared as combination of MetaMathQA and MathInstruct, and some internal data. Refer math_QAaugP
Model Usage
import torch
from transformers import (
AutoModelForCausalLM,
AutoTokenizer
)
from peft import PeftModel
model_path = "mistralai/Mistral-7B-v0.1"
model = AutoModelForCausalLM.from_pretrained(
model_path,
torch_dtype = torch.float16,
device_map = {"": 0},
)
# Load LoRA and merge
model = PeftModel.from_pretrained(model, "adityasihag/math_QA-Mistral-7B-QLoRA-adapter")
model = model.merge_and_unload()
tokenizer = AutoTokenizer.from_pretrained(model_path, trust_remote_code=True)
tokenizer.pad_token = tokenizer.eos_token
question = """Solve the linear equations. $3(x+2)-x=x + 9$. Find the value of x."""
sample_input = f"""Question: {question} \n Answer: """
sample_input_tokenised = tokenizer(sample_input, return_tensors = "pt").to("cuda")
generated_ids = model.generate(
**sample_input_tokenised,
max_new_tokens = 1024,
temperature = 0.3
)
output = tokenizer.decode(generated_ids[0], skip_special_tokens = True)
print(output)
Sample Input:
Question: Solve the linear equations. $3(x+2)-x=x + 9$. Find the value of x. \n Answer:
Model Output:
Given the linear equation 3(x+2)-x=x+9.
First, distribute the 3 in the brackets to get 3x + 6 - x = x + 9.
Simplify the equation to get 2x + 6 = x + 9.
Next, transpose x from the right side to the left side and from the left side to the right side to get x = 9 - 6.
Finally, solve for x to get x = 3.
Prompt Template:
Question: <question>
Answer:
Comparing math_QA models with other SFT LLM models
| Model | GSM8k Pass@1 | MATH Pass@1 |
|---|---|---|
| LLaMA-2-7B | 14.6 | 2.5 |
| gemma-2b | 17.7 | |
| LLaMA-2-13B | 28.7 | 3.9 |
| LLaMA-2-34B | 42.2 | 6.24 |
| math_QA-gemma-2B | 43.66 | |
| gemma-7b | 46.4 | |
| WizardMath-7B | 54.9 | 10.7 |
| Mistral-7B | 35.4 | |
| WizardMath-13B | 63.9 | 14.0 |
| MetaMath-7B | 66.5 | 19.8 |
| MetaMath-13B | 72.3 | 22.4 |
| math_QA-Mistral-7B | 75.81 | |
| Arithmo2-Mistral-7B | 76.4 | 27.2 |
| MetaMath-Mistral-7B | 77.7 | 28.2 |
| DeepSeekMath-Instruct-7B | 82.9 | 46.8 |
| GPT4 | 92.0 | 52.9 |
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